mirror of
https://github.com/PixarAnimationStudios/OpenSubdiv
synced 2024-12-05 01:10:05 +00:00
479a297bc6
- fixed corner vertex cases (two boundary edges) in both Far and Osd
1402 lines
50 KiB
C++
1402 lines
50 KiB
C++
//
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// Copyright 2013 Pixar
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//
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// Licensed under the Apache License, Version 2.0 (the "Apache License")
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// with the following modification; you may not use this file except in
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// compliance with the Apache License and the following modification to it:
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// Section 6. Trademarks. is deleted and replaced with:
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//
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// 6. Trademarks. This License does not grant permission to use the trade
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// names, trademarks, service marks, or product names of the Licensor
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// and its affiliates, except as required to comply with Section 4(c) of
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// the License and to reproduce the content of the NOTICE file.
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//
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// You may obtain a copy of the Apache License at
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//
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// http://www.apache.org/licenses/LICENSE-2.0
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//
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// Unless required by applicable law or agreed to in writing, software
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// distributed under the Apache License with the above modification is
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// distributed on an "AS IS" BASIS, WITHOUT WARRANTIES OR CONDITIONS OF ANY
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// KIND, either express or implied. See the Apache License for the specific
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// language governing permissions and limitations under the Apache License.
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//
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#include "../far/patchBasis.h"
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#include "../far/patchDescriptor.h"
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#include <cassert>
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#include <cstring>
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#include <cmath>
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#include <cstdio>
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namespace OpenSubdiv {
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namespace OPENSUBDIV_VERSION {
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namespace Far {
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namespace internal {
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//
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// Basis support for quadrilateral patches:
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//
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// Quadrilateral patches are parameterized in terms of (s,t) as follows:
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//
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// (1,0) *---------* (1,1)
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// | 3 2 |
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// t | |
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// | |
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// | 0 1 |
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// (0,0) *---------* (1,0)
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// s
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//
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//
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// Simple bilinear quad:
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//
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template <typename REAL>
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int
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EvalBasisLinear(REAL s, REAL t,
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REAL wP[4], REAL wDs[4], REAL wDt[4],
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REAL wDss[4], REAL wDst[4], REAL wDtt[4]) {
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REAL sC = 1.0f - s;
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REAL tC = 1.0f - t;
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if (wP) {
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wP[0] = sC * tC;
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wP[1] = s * tC;
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wP[2] = s * t;
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wP[3] = sC * t;
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}
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if (wDs && wDt) {
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wDs[0] = -tC;
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wDs[1] = tC;
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wDs[2] = t;
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wDs[3] = -t;
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wDt[0] = -sC;
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wDt[1] = -s;
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wDt[2] = s;
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wDt[3] = sC;
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if (wDss && wDst && wDtt) {
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for(int i = 0; i < 4; ++i) {
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wDss[i] = 0.0f;
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wDtt[i] = 0.0f;
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}
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wDst[0] = 1.0f;
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wDst[1] = -1.0f;
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wDst[2] = -1.0f;
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wDst[3] = 1.0f;
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}
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}
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return 4;
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}
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//
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// Bicubic BSpline patch:
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//
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// 12-----13------14-----15
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// | | | |
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// | | | |
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// 8------9------10-----11
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// | | t | |
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// | | s | |
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// 4------5------6------7
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// | | | |
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// | | | |
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// O------1------2------3
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//
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// The basis if a bicubic BSpline patch is a tensor product, which we make
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// use of here by evaluating, differentiating and combining basis functions
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// in each of the two parametric directions.
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//
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// Not all 16 points will be present. The boundary mask indicates boundary
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// edges beyond which phantom points are implicitly extrapolated. Weights
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// for missing points are set to zero while those contributing to their
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// implicit extrapolation will be adjusted.
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//
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namespace {
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//
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// Cubic BSpline curve basis evaluation:
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//
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template <typename REAL>
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void
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evalBSplineCurve(REAL t, REAL wP[4], REAL wDP[4], REAL wDP2[4]) {
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REAL const one6th = (REAL)(1.0 / 6.0);
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REAL t2 = t * t;
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REAL t3 = t * t2;
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wP[0] = one6th * (1.0f - 3.0f*(t - t2) - t3);
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wP[1] = one6th * (4.0f - 6.0f*t2 + 3.0f*t3);
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wP[2] = one6th * (1.0f + 3.0f*(t + t2 - t3));
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wP[3] = one6th * ( t3);
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if (wDP) {
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wDP[0] = -0.5f*t2 + t - 0.5f;
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wDP[1] = 1.5f*t2 - 2.0f*t;
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wDP[2] = -1.5f*t2 + t + 0.5f;
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wDP[3] = 0.5f*t2;
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}
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if (wDP2) {
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wDP2[0] = - t + 1.0f;
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wDP2[1] = 3.0f * t - 2.0f;
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wDP2[2] = -3.0f * t + 1.0f;
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wDP2[3] = t;
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}
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}
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//
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// Weight adjustments to account for phantom end points:
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//
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template <typename REAL>
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void
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adjustBSplineBoundaryWeights(int boundary, REAL w[16]) {
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if ((boundary & 1) != 0) {
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for (int i = 0; i < 4; ++i) {
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w[i + 8] -= w[i + 0];
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w[i + 4] += w[i + 0] * 2.0f;
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w[i + 0] = 0.0f;
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}
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}
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if ((boundary & 2) != 0) {
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for (int i = 0; i < 16; i += 4) {
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w[i + 1] -= w[i + 3];
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w[i + 2] += w[i + 3] * 2.0f;
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w[i + 3] = 0.0f;
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}
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}
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if ((boundary & 4) != 0) {
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for (int i = 0; i < 4; ++i) {
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w[i + 4] -= w[i + 12];
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w[i + 8] += w[i + 12] * 2.0f;
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w[i + 12] = 0.0f;
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}
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}
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if ((boundary & 8) != 0) {
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for (int i = 0; i < 16; i += 4) {
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w[i + 2] -= w[i + 0];
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w[i + 1] += w[i + 0] * 2.0f;
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w[i + 0] = 0.0f;
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}
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}
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}
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template <typename REAL>
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void
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boundBasisBSpline(int boundary,
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REAL wP[16], REAL wDs[16], REAL wDt[16],
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REAL wDss[16], REAL wDst[16], REAL wDtt[16]) {
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if (wP) {
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adjustBSplineBoundaryWeights(boundary, wP);
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}
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if (wDs && wDt) {
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adjustBSplineBoundaryWeights(boundary, wDs);
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adjustBSplineBoundaryWeights(boundary, wDt);
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if (wDss && wDst && wDtt) {
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adjustBSplineBoundaryWeights(boundary, wDss);
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adjustBSplineBoundaryWeights(boundary, wDst);
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adjustBSplineBoundaryWeights(boundary, wDtt);
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}
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}
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}
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} // end namespace
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template <typename REAL>
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int
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EvalBasisBSpline(REAL s, REAL t,
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REAL wP[16], REAL wDs[16], REAL wDt[16],
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REAL wDss[16], REAL wDst[16], REAL wDtt[16]) {
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REAL sWeights[4], tWeights[4], dsWeights[4], dtWeights[4], dssWeights[4], dttWeights[4];
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evalBSplineCurve(s, wP ? sWeights : 0, wDs ? dsWeights : 0, wDss ? dssWeights : 0);
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evalBSplineCurve(t, wP ? tWeights : 0, wDt ? dtWeights : 0, wDtt ? dttWeights : 0);
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if (wP) {
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for (int i = 0; i < 4; ++i) {
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for (int j = 0; j < 4; ++j) {
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wP[4*i+j] = sWeights[j] * tWeights[i];
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}
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}
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}
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if (wDs && wDt) {
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for (int i = 0; i < 4; ++i) {
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for (int j = 0; j < 4; ++j) {
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wDs[4*i+j] = dsWeights[j] * tWeights[i];
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wDt[4*i+j] = sWeights[j] * dtWeights[i];
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}
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}
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if (wDss && wDst && wDtt) {
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for (int i = 0; i < 4; ++i) {
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for (int j = 0; j < 4; ++j) {
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wDss[4*i+j] = dssWeights[j] * tWeights[i];
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wDst[4*i+j] = dsWeights[j] * dtWeights[i];
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wDtt[4*i+j] = sWeights[j] * dttWeights[i];
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}
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}
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}
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}
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return 16;
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}
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//
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// Bicubic Bezier patch:
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//
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// 12-----13------14-----15
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// | | | |
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// | | | |
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// 8------9------10-----11
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// | | | |
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// | | | |
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// 4------5------6------7
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// | t | | |
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// | s | | |
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// O------1------2------3
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//
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// As was the case with the BSpline patch, a bicubic Bezier patch can also
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// make use of its tensor product property by evaluating, differentiating
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// and combining basis functions in each of the two parametric directions.
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//
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namespace {
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//
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// Cubic Bezier curve basis evaluation:
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//
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template <typename REAL>
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void
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evalBezierCurve(REAL t, REAL wP[4], REAL wDP[4], REAL wDP2[4]) {
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// The four uniform cubic Bezier basis functions (in terms of t and its
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// complement tC) evaluated at t:
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REAL t2 = t*t;
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REAL tC = 1.0f - t;
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REAL tC2 = tC * tC;
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wP[0] = tC2 * tC;
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wP[1] = tC2 * t * 3.0f;
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wP[2] = t2 * tC * 3.0f;
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wP[3] = t2 * t;
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// Derivatives of the above four basis functions at t:
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if (wDP) {
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wDP[0] = -3.0f * tC2;
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wDP[1] = 9.0f * t2 - 12.0f * t + 3.0f;
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wDP[2] = -9.0f * t2 + 6.0f * t;
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wDP[3] = 3.0f * t2;
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}
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// Second derivatives of the basis functions at t:
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if (wDP2) {
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wDP2[0] = 6.0f * tC;
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wDP2[1] = 18.0f * t - 12.0f;
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wDP2[2] = -18.0f * t + 6.0f;
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wDP2[3] = 6.0f * t;
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}
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}
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} // end namespace
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template <typename REAL>
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int
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EvalBasisBezier(REAL s, REAL t,
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REAL wP[16], REAL wDs[16], REAL wDt[16],
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REAL wDss[16], REAL wDst[16], REAL wDtt[16]) {
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REAL sWeights[4], tWeights[4], dsWeights[4], dtWeights[4], dssWeights[4], dttWeights[4];
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evalBezierCurve(s, wP ? sWeights : 0, wDs ? dsWeights : 0, wDss ? dssWeights : 0);
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evalBezierCurve(t, wP ? tWeights : 0, wDt ? dtWeights : 0, wDtt ? dttWeights : 0);
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if (wP) {
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for (int i = 0; i < 4; ++i) {
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for (int j = 0; j < 4; ++j) {
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wP[4*i+j] = sWeights[j] * tWeights[i];
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}
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}
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}
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if (wDs && wDt) {
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for (int i = 0; i < 4; ++i) {
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for (int j = 0; j < 4; ++j) {
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wDs[4*i+j] = dsWeights[j] * tWeights[i];
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wDt[4*i+j] = sWeights[j] * dtWeights[i];
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}
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}
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if (wDss && wDst && wDtt) {
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for (int i = 0; i < 4; ++i) {
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for (int j = 0; j < 4; ++j) {
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wDss[4*i+j] = dssWeights[j] * tWeights[i];
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wDst[4*i+j] = dsWeights[j] * dtWeights[i];
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wDtt[4*i+j] = sWeights[j] * dttWeights[i];
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}
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}
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}
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}
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return 16;
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}
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//
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// Cubic Gregory patch:
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//
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// P3 e3- e2+ P2
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// 15------17-------11--------10
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// | | | |
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// | | | |
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// | | f3- | f2+ |
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// | 19 13 |
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// e3+ 16-----18 14-----12 e2-
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// | f3+ f2- |
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// | |
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// | |
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// | f0- f1+ |
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// e0- 2------4 8------6 e1+
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// | 3 9 |
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// | | f0+ | f1- |
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// | t | | |
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// | s | | |
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// O--------1--------7--------5
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// P0 e0+ e1- P1
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//
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// The 20-point cubic Gregory patch is an extension of the 16-point bicubic
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// Bezier patch with the 4 interior points of the Bezier patch replaced with
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// pairs of points (face points -- fi+ and fi-) that are rationally combined.
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//
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// The point ordering of the Gregory patch deviates considerably from the
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// BSpline and Bezier patches by grouping the 5 points at each corner and
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// ordering the groups by corner index.
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//
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template <typename REAL>
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int
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EvalBasisGregory(REAL s, REAL t,
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REAL point[20], REAL wDs[20], REAL wDt[20],
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REAL wDss[20], REAL wDst[20], REAL wDtt[20]) {
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// Indices of boundary and interior points and their corresponding Bezier points
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// (this can be reduced with more direct indexing and unrolling of loops):
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//
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static int const boundaryGregory[12] = { 0, 1, 7, 5, 2, 6, 16, 12, 15, 17, 11, 10 };
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static int const boundaryBezSCol[12] = { 0, 1, 2, 3, 0, 3, 0, 3, 0, 1, 2, 3 };
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static int const boundaryBezTRow[12] = { 0, 0, 0, 0, 1, 1, 2, 2, 3, 3, 3, 3 };
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static int const interiorGregory[8] = { 3, 4, 8, 9, 13, 14, 18, 19 };
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static int const interiorBezSCol[8] = { 1, 1, 2, 2, 2, 2, 1, 1 };
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static int const interiorBezTRow[8] = { 1, 1, 1, 1, 2, 2, 2, 2 };
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//
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// Bezier basis functions are denoted with B while the rational multipliers for the
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// interior points will be denoted G -- so we have B(s), B(t) and G(s,t):
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//
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// Directional Bezier basis functions B at s and t:
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REAL Bs[4], Bds[4], Bdss[4];
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REAL Bt[4], Bdt[4], Bdtt[4];
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evalBezierCurve(s, Bs, wDs ? Bds : 0, wDss ? Bdss : 0);
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evalBezierCurve(t, Bt, wDt ? Bdt : 0, wDtt ? Bdtt : 0);
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// Rational multipliers G at s and t:
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REAL sC = 1.0f - s;
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REAL tC = 1.0f - t;
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// Use <= here to avoid compiler warnings -- the sums should always be non-negative:
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REAL df0 = s + t; df0 = (df0 <= 0.0f) ? (REAL)1.0f : (1.0f / df0);
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REAL df1 = sC + t; df1 = (df1 <= 0.0f) ? (REAL)1.0f : (1.0f / df1);
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REAL df2 = sC + tC; df2 = (df2 <= 0.0f) ? (REAL)1.0f : (1.0f / df2);
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REAL df3 = s + tC; df3 = (df3 <= 0.0f) ? (REAL)1.0f : (1.0f / df3);
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REAL G[8] = { s*df0, t*df0, t*df1, sC*df1, sC*df2, tC*df2, tC*df3, s*df3 };
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// Combined weights for boundary and interior points:
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for (int i = 0; i < 12; ++i) {
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point[boundaryGregory[i]] = Bs[boundaryBezSCol[i]] * Bt[boundaryBezTRow[i]];
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}
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for (int i = 0; i < 8; ++i) {
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point[interiorGregory[i]] = Bs[interiorBezSCol[i]] * Bt[interiorBezTRow[i]] * G[i];
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}
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//
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// For derivatives, the basis functions for the interior points are rational and ideally
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// require appropriate differentiation, i.e. product rule for the combination of B and G
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// and the quotient rule for the rational G itself. As initially proposed by Loop et al
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// though, the approximation using the 16 Bezier points arising from the G(s,t) has
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// proved adequate (and is what the GPU shaders use) so we continue to use that here.
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//
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// An implementation of the true derivatives is provided and conditionally compiled for
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// those that require it, e.g.:
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//
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// dclyde's note: skipping half of the product rule like this does seem to change the
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// result a lot in my tests. This is not a runtime bottleneck for cloth sims anyway
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// so I'm just using the accurate version.
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//
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if (wDs && wDt) {
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bool find_second_partials = wDs && wDst && wDtt;
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// Combined weights for boundary points -- simple tensor products:
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for (int i = 0; i < 12; ++i) {
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int iDst = boundaryGregory[i];
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int tRow = boundaryBezTRow[i];
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int sCol = boundaryBezSCol[i];
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wDs[iDst] = Bds[sCol] * Bt[tRow];
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wDt[iDst] = Bdt[tRow] * Bs[sCol];
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if (find_second_partials) {
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wDss[iDst] = Bdss[sCol] * Bt[tRow];
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wDst[iDst] = Bds[sCol] * Bdt[tRow];
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wDtt[iDst] = Bs[sCol] * Bdtt[tRow];
|
|
}
|
|
}
|
|
|
|
#ifndef OPENSUBDIV_GREGORY_EVAL_TRUE_DERIVATIVES
|
|
// Approximation to the true Gregory derivatives by differentiating the Bezier patch
|
|
// unique to the given (s,t), i.e. having F = (g^+ * f^+) + (g^- * f^-) as its four
|
|
// interior points:
|
|
//
|
|
// Combined weights for interior points -- tensor products with G+ or G-:
|
|
for (int i = 0; i < 8; ++i) {
|
|
int iDst = interiorGregory[i];
|
|
int tRow = interiorBezTRow[i];
|
|
int sCol = interiorBezSCol[i];
|
|
|
|
wDs[iDst] = Bds[sCol] * Bt[tRow] * G[i];
|
|
wDt[iDst] = Bdt[tRow] * Bs[sCol] * G[i];
|
|
|
|
if (find_second_partials) {
|
|
wDss[iDst] = Bdss[sCol] * Bt[tRow] * G[i];
|
|
wDst[iDst] = Bds[sCol] * Bdt[tRow] * G[i];
|
|
wDtt[iDst] = Bs[sCol] * Bdtt[tRow] * G[i];
|
|
}
|
|
}
|
|
#else
|
|
// True Gregory derivatives using appropriate differentiation of composite functions:
|
|
//
|
|
// Note that for G(s,t) = N(s,t) / D(s,t), all N' and D' are trivial constants (which
|
|
// simplifies things for higher order derivatives). And while each pair of functions
|
|
// G (i.e. the G+ and G- corresponding to points f+ and f-) must sum to 1 to ensure
|
|
// Bezier equivalence (when f+ = f-), the pairs of G' must similarly sum to 0. So we
|
|
// can potentially compute only one of the pair and negate the result for the other
|
|
// (and with 4 or 8 computations involving these constants, this is all very SIMD
|
|
// friendly...) but for now we treat all 8 independently for simplicity.
|
|
//
|
|
//REAL N[8] = { s, t, t, sC, sC, tC, tC, s };
|
|
REAL D[8] = { df0, df0, df1, df1, df2, df2, df3, df3 };
|
|
|
|
static REAL const Nds[8] = { 1.0f, 0.0f, 0.0f, -1.0f, -1.0f, 0.0f, 0.0f, 1.0f };
|
|
static REAL const Ndt[8] = { 0.0f, 1.0f, 1.0f, 0.0f, 0.0f, -1.0f, -1.0f, 0.0f };
|
|
|
|
static REAL const Dds[8] = { 1.0f, 1.0f, -1.0f, -1.0f, -1.0f, -1.0f, 1.0f, 1.0f };
|
|
static REAL const Ddt[8] = { 1.0f, 1.0f, 1.0f, 1.0f, -1.0f, -1.0f, -1.0f, -1.0f };
|
|
|
|
// Combined weights for interior points -- combinations of B, B', G and G':
|
|
for (int i = 0; i < 8; ++i) {
|
|
int iDst = interiorGregory[i];
|
|
int tRow = interiorBezTRow[i];
|
|
int sCol = interiorBezSCol[i];
|
|
|
|
// Quotient rule for G' (re-expressed in terms of G to simplify (and D = 1/D)):
|
|
REAL Gds = (Nds[i] - Dds[i] * G[i]) * D[i];
|
|
REAL Gdt = (Ndt[i] - Ddt[i] * G[i]) * D[i];
|
|
|
|
// Product rule combining B and B' with G and G':
|
|
wDs[iDst] = (Bds[sCol] * G[i] + Bs[sCol] * Gds) * Bt[tRow];
|
|
wDt[iDst] = (Bdt[tRow] * G[i] + Bt[tRow] * Gdt) * Bs[sCol];
|
|
|
|
if (find_second_partials) {
|
|
REAL Dsqr_inv = D[i]*D[i];
|
|
|
|
REAL Gdss = 2.0f * Dds[i] * Dsqr_inv * (G[i] * Dds[i] - Nds[i]);
|
|
REAL Gdst = Dsqr_inv * (2.0f * G[i] * Dds[i] * Ddt[i] - Nds[i] * Ddt[i] - Ndt[i] * Dds[i]);
|
|
REAL Gdtt = 2.0f * Ddt[i] * Dsqr_inv * (G[i] * Ddt[i] - Ndt[i]);
|
|
|
|
wDss[iDst] = (Bdss[sCol] * G[i] + 2.0f * Bds[sCol] * Gds + Bs[sCol] * Gdss) * Bt[tRow];
|
|
wDst[iDst] = Bt[tRow] * (Bs[sCol] * Gdst + Bds[sCol] * Gdt) +
|
|
Bdt[tRow] * (Bds[sCol] * G[i] + Bs[sCol] * Gds);
|
|
wDtt[iDst] = (Bdtt[tRow] * G[i] + 2.0f * Bdt[tRow] * Gdt + Bt[tRow] * Gdtt) * Bs[sCol];
|
|
}
|
|
}
|
|
#endif
|
|
}
|
|
return 20;
|
|
}
|
|
|
|
|
|
//
|
|
// Basis support for triangular patches:
|
|
//
|
|
// Triangular patches may be evaluated in barycentric (trivariate) or
|
|
// bivariate form, depending on the complexity of their basis functions.
|
|
// The parametric orientation for a triangle is as follows:
|
|
//
|
|
// (1,0)
|
|
// *
|
|
// . .
|
|
// t . 2 .
|
|
// . .
|
|
// . 0 1 .
|
|
// (0,0) *---------* (1,0)
|
|
// s
|
|
//
|
|
// With the origin (0,0) -- barycentric (0,0,w = 1) -- oriented at the
|
|
// corner V0, the corners V0, V1, and V2 correspond to barycentric
|
|
// coordinates W, U and V. This is consistent with GPU tessellation
|
|
// shaders, but not with many publications where the corners correspond
|
|
// more intuitively to U, V and W.
|
|
//
|
|
|
|
|
|
//
|
|
// Simple linear triangle:
|
|
//
|
|
template <typename REAL>
|
|
int
|
|
EvalBasisLinearTri(REAL s, REAL t,
|
|
REAL wP[3], REAL wDs[3], REAL wDt[3],
|
|
REAL wDss[3], REAL wDst[3], REAL wDtt[3]) {
|
|
|
|
if (wP) {
|
|
wP[0] = 1.0f - s - t;
|
|
wP[1] = s;
|
|
wP[2] = t;
|
|
}
|
|
if (wDs && wDt) {
|
|
wDs[0] = -1.0f;
|
|
wDs[1] = 1.0f;
|
|
wDs[2] = 0.0f;
|
|
|
|
wDt[0] = -1.0f;
|
|
wDt[1] = 0.0f;
|
|
wDt[2] = 1.0f;
|
|
|
|
if (wDss && wDst && wDtt) {
|
|
wDss[0] = wDss[1] = wDss[2] = 0.0f;
|
|
wDst[0] = wDst[1] = wDst[2] = 0.0f;
|
|
wDtt[0] = wDtt[1] = wDtt[2] = 0.0f;
|
|
}
|
|
}
|
|
return 3;
|
|
}
|
|
|
|
|
|
//
|
|
// Quartic Box spline triangle:
|
|
//
|
|
// Points for the quartic triangular Box spline (representing regular
|
|
// patches for Loop subdivision) are as follows:
|
|
//
|
|
// 10-----11
|
|
// . . . .
|
|
// . . . .
|
|
// 7-----8-----9
|
|
// . . . . . .
|
|
// . . . . . .
|
|
// 3-----4-----5-----6
|
|
// . . . . . .
|
|
// . . . . . /
|
|
// 0-----1-----2
|
|
//
|
|
// Stam provided the basis functions for these patches in terms of barycentric
|
|
// coordinates (u,v,w) (see Stam's "Evaluation of Loop Subdivision Surfaces").
|
|
// Unfortunately, unlike the basis functions for a quartic Bezier triangle,
|
|
// they are not very compact -- 3 functions involving 9 quartic terms and 3
|
|
// others involving 15 quartic terms. (In contrast, the maximum number of
|
|
// terms in bivariate form is 15.)
|
|
//
|
|
// Since we also need to differentiate with respect to u and v, we eliminate w
|
|
// and use the coefficient matrix C multiplied by the set of monomials M
|
|
// evaluated at (u,v), i.e. the full set of basis functions is:
|
|
//
|
|
// B(u,v) = C * M(u,v)
|
|
//
|
|
// where
|
|
//
|
|
// M(u,v) = { 1, u,v, uu,uv,vv, uuu,uuv,uvv,vvv, uuuu,uuuv,uuvv,uvvv,vvvv }
|
|
//
|
|
// and the 12 x 15 matrix C is as follows, scaled by a common factor of 1/12:
|
|
//
|
|
// { 1, -2,-4, 0, 6, 6, 2, 0, -6, -4, -1, -2, 0, 2, 1 },
|
|
// { 1, 2,-2, 0, -6, 0, -4, 0, 6, 2, 2, 4, 0, -2, -1 },
|
|
// { 0, 0, 0, 0, 0, 0, 2, 0, 0, 0, -1, -2, 0, 0, 0 },
|
|
// { 1, -4,-2, 6, 6, 0, -4, -6, 0, 2, 1, 2, 0, -2, -1 },
|
|
// { 6, 0, 0, -12,-12,-12, 8, 12, 12, 8, -1, -2, 0, -2, -1 },
|
|
// { 1, 4, 2, 6, 6, 0, -4, -6,-12, -4, -1, -2, 0, 4, 2 },
|
|
// { 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 1, 2, 0, 0, 0 },
|
|
// { 1, -2, 2, 0, -6, 0, 2, 6, 0, -4, -1, -2, 0, 4, 2 },
|
|
// { 1, 2, 4, 0, 6, 6, -4,-12, -6, -4, 2, 4, 0, -2, -1 },
|
|
// { 0, 0, 0, 0, 0, 0, 2, 6, 6, 2, -1, -2, 0, -2, -1 },
|
|
// { 0, 0, 0, 0, 0, 0, 0, 0, 0, 2, 0, 0, 0, -2, -1 },
|
|
// { 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 2, 1 }
|
|
//
|
|
// Differentiating the monomials and refactoring yields a unique set of
|
|
// coefficients for each of the derivatives, which we multiply by M(u,v).
|
|
//
|
|
namespace {
|
|
template <typename REAL>
|
|
inline void
|
|
evalBivariateMonomialsQuartic(REAL s, REAL t, REAL M[]) {
|
|
|
|
M[0] = 1.0;
|
|
|
|
M[1] = s;
|
|
M[2] = t;
|
|
|
|
M[3] = s * s;
|
|
M[4] = s * t;
|
|
M[5] = t * t;
|
|
|
|
M[6] = M[3] * s;
|
|
M[7] = M[4] * s;
|
|
M[8] = M[4] * t;
|
|
M[9] = M[5] * t;
|
|
|
|
M[10] = M[6] * s;
|
|
M[11] = M[7] * s;
|
|
M[12] = M[3] * M[5];
|
|
M[13] = M[8] * t;
|
|
M[14] = M[9] * t;
|
|
}
|
|
|
|
template <typename REAL>
|
|
void
|
|
evalBoxSplineTriDerivWeights(REAL const stMonomials[], int ds, int dt, REAL w[]) {
|
|
|
|
REAL const * M = stMonomials;
|
|
|
|
REAL S = 1.0;
|
|
|
|
int totalOrder = ds + dt;
|
|
if (totalOrder == 0) {
|
|
S *= (REAL) (1.0 / 12.0);
|
|
|
|
w[0] = S * (1 - 2*M[1] - 4*M[2] + 6*M[4] + 6*M[5] + 2*M[6] - 6*M[8] - 4*M[9] - M[10] - 2*M[11] + 2*M[13] + M[14]);
|
|
w[1] = S * (1 + 2*M[1] - 2*M[2] - 6*M[4] - 4*M[6] + 6*M[8] + 2*M[9] + 2*M[10] + 4*M[11] - 2*M[13] - M[14]);
|
|
w[2] = S * ( 2*M[6] - M[10] - 2*M[11] );
|
|
w[3] = S * (1 - 4*M[1] - 2*M[2] + 6*M[3] + 6*M[4] - 4*M[6] - 6*M[7] + 2*M[9] + M[10] + 2*M[11] - 2*M[13] - M[14]);
|
|
w[4] = S * (6 -12*M[3] -12*M[4] -12*M[5] + 8*M[6] +12*M[7] +12*M[8] + 8*M[9] - M[10] - 2*M[11] - 2*M[13] - M[14]);
|
|
w[5] = S * (1 + 4*M[1] + 2*M[2] + 6*M[3] + 6*M[4] - 4*M[6] - 6*M[7] -12*M[8] - 4*M[9] - M[10] - 2*M[11] + 4*M[13] + 2*M[14]);
|
|
w[6] = S * ( M[10] + 2*M[11] );
|
|
w[7] = S * (1 - 2*M[1] + 2*M[2] - 6*M[4] + 2*M[6] + 6*M[7] - 4*M[9] - M[10] - 2*M[11] + 4*M[13] + 2*M[14]);
|
|
w[8] = S * (1 + 2*M[1] + 4*M[2] + 6*M[4] + 6*M[5] - 4*M[6] -12*M[7] - 6*M[8] - 4*M[9] + 2*M[10] + 4*M[11] - 2*M[13] - M[14]);
|
|
w[9] = S * ( 2*M[6] + 6*M[7] + 6*M[8] + 2*M[9] - M[10] - 2*M[11] - 2*M[13] - M[14]);
|
|
w[10] = S * ( 2*M[9] - 2*M[13] - M[14]);
|
|
w[11] = S * ( 2*M[13] + M[14]);
|
|
} else if (totalOrder == 1) {
|
|
S *= (REAL) (1.0 / 6.0);
|
|
|
|
if (ds) {
|
|
w[0] = S * (-1 + 3*M[2] + 3*M[3] - 3*M[5] - 2*M[6] - 3*M[7] + M[9]);
|
|
w[1] = S * ( 1 - 3*M[2] - 6*M[3] + 3*M[5] + 4*M[6] + 6*M[7] - M[9]);
|
|
w[2] = S * ( 3*M[3] - 2*M[6] - 3*M[7] );
|
|
w[3] = S * (-2 + 6*M[1] + 3*M[2] - 6*M[3] - 6*M[4] + 2*M[6] + 3*M[7] - M[9]);
|
|
w[4] = S * ( -12*M[1] - 6*M[2] +12*M[3] +12*M[4] + 6*M[5] - 2*M[6] - 3*M[7] - M[9]);
|
|
w[5] = S * ( 2 + 6*M[1] + 3*M[2] - 6*M[3] - 6*M[4] - 6*M[5] - 2*M[6] - 3*M[7] + 2*M[9]);
|
|
w[6] = S * ( 2*M[6] + 3*M[7] );
|
|
w[7] = S * (-1 - 3*M[2] + 3*M[3] + 6*M[4] - 2*M[6] - 3*M[7] + 2*M[9]);
|
|
w[8] = S * ( 1 + 3*M[2] - 6*M[3] -12*M[4] - 3*M[5] + 4*M[6] + 6*M[7] - M[9]);
|
|
w[9] = S * ( 3*M[3] + 6*M[4] + 3*M[5] - 2*M[6] - 3*M[7] - M[9]);
|
|
w[10] = S * ( - M[9]);
|
|
w[11] = S * ( M[9]);
|
|
} else {
|
|
w[0] = S * (-2 + 3*M[1] + 6*M[2] - 6*M[4] - 6*M[5] - M[6] + 3*M[8] + 2*M[9]);
|
|
w[1] = S * (-1 - 3*M[1] + 6*M[4] + 3*M[5] + 2*M[6] - 3*M[8] - 2*M[9]);
|
|
w[2] = S * ( - M[6] );
|
|
w[3] = S * (-1 + 3*M[1] - 3*M[3] + 3*M[5] + M[6] - 3*M[8] - 2*M[9]);
|
|
w[4] = S * ( - 6*M[1] -12*M[2] + 6*M[3] +12*M[4] +12*M[5] - M[6] - 3*M[8] - 2*M[9]);
|
|
w[5] = S * ( 1 + 3*M[1] - 3*M[3] -12*M[4] - 6*M[5] - M[6] + 6*M[8] + 4*M[9]);
|
|
w[6] = S * ( + M[6] );
|
|
w[7] = S * ( 1 - 3*M[1] + 3*M[3] - 6*M[5] - M[6] + 6*M[8] + 4*M[9]);
|
|
w[8] = S * ( 2 + 3*M[1] + 6*M[2] - 6*M[3] - 6*M[4] - 6*M[5] + 2*M[6] - 3*M[8] - 2*M[9]);
|
|
w[9] = S * ( + 3*M[3] + 6*M[4] + 3*M[5] - M[6] - 3*M[8] - 2*M[9]);
|
|
w[10] = S * ( 3*M[5] - 3*M[8] - 2*M[9]);
|
|
w[11] = S * ( 3*M[8] + 2*M[9]);
|
|
}
|
|
} else if (totalOrder == 2) {
|
|
if (ds == 2) {
|
|
w[0] = S * ( + M[1] - M[3] - M[4]);
|
|
w[1] = S * ( - 2*M[1] + 2*M[3] + 2*M[4]);
|
|
w[2] = S * ( M[1] - M[3] - M[4]);
|
|
w[3] = S * ( 1 - 2*M[1] - M[2] + M[3] + M[4]);
|
|
w[4] = S * (-2 + 4*M[1] + 2*M[2] - M[3] - M[4]);
|
|
w[5] = S * ( 1 - 2*M[1] - M[2] - M[3] - M[4]);
|
|
w[6] = S * ( M[3] + M[4]);
|
|
w[7] = S * ( + M[1] + M[2] - M[3] - M[4]);
|
|
w[8] = S * ( - 2*M[1] - 2*M[2] + 2*M[3] + 2*M[4]);
|
|
w[9] = S * ( M[1] + M[2] - M[3] - M[4]);
|
|
w[10] = 0;
|
|
w[11] = 0;
|
|
} else if (dt == 2) {
|
|
w[0] = S * ( 1 - M[1] - 2*M[2] + M[4] + M[5]);
|
|
w[1] = S * ( + M[1] + M[2] - M[4] - M[5]);
|
|
w[2] = 0;
|
|
w[3] = S * ( + M[2] - M[4] - M[5]);
|
|
w[4] = S * (-2 + 2*M[1] + 4*M[2] - M[4] - M[5]);
|
|
w[5] = S * ( - 2*M[1] - 2*M[2] + 2*M[4] + 2*M[5]);
|
|
w[6] = 0;
|
|
w[7] = S * ( - 2*M[2] + 2*M[4] + 2*M[5]);
|
|
w[8] = S * ( 1 - M[1] - 2*M[2] - M[4] - M[5]);
|
|
w[9] = S * ( + M[1] + M[2] - M[4] - M[5]);
|
|
w[10] = S * ( M[2] - M[4] - M[5]);
|
|
w[11] = S * ( M[4] + M[5]);
|
|
} else {
|
|
S *= (REAL) (1.0 / 2.0);
|
|
|
|
w[0] = S * ( 1 - 2*M[2] - M[3] + M[5]);
|
|
w[1] = S * (-1 + 2*M[2] + 2*M[3] - M[5]);
|
|
w[2] = S * ( - M[3] );
|
|
w[3] = S * ( 1 - 2*M[1] + M[3] - M[5]);
|
|
w[4] = S * (-2 + 4*M[1] + 4*M[2] - M[3] - M[5]);
|
|
w[5] = S * ( 1 - 2*M[1] - 4*M[2] - M[3] + 2*M[5]);
|
|
w[6] = S * ( + M[3] );
|
|
w[7] = S * (-1 + 2*M[1] - M[3] + 2*M[5]);
|
|
w[8] = S * ( 1 - 4*M[1] - 2*M[2] + 2*M[3] - M[5]);
|
|
w[9] = S * ( + 2*M[1] + 2*M[2] - M[3] - M[5]);
|
|
w[10] = S * ( - M[5]);
|
|
w[11] = S * ( M[5]);
|
|
}
|
|
} else {
|
|
assert(totalOrder <= 2);
|
|
}
|
|
}
|
|
|
|
template <typename REAL>
|
|
void
|
|
adjustBoxSplineTriBoundaryWeights(int boundaryMask, REAL weights[]) {
|
|
|
|
if (boundaryMask == 0) return;
|
|
|
|
//
|
|
// Determine boundary edges and vertices from the lower 3 and upper
|
|
// 2 bits of the 5-bit mask:
|
|
//
|
|
int upperBits = (boundaryMask >> 3) & 0x3;
|
|
int lowerBits = boundaryMask & 7;
|
|
|
|
int eBits = lowerBits;
|
|
int vBits = 0;
|
|
|
|
if (upperBits == 1) {
|
|
// Boundary vertices only:
|
|
vBits = eBits;
|
|
eBits = 0;
|
|
} else if (upperBits == 2) {
|
|
// Opposite vertex bit is edge bit rotated one to the right:
|
|
vBits = ((eBits & 1) << 2) | (eBits >> 1);
|
|
}
|
|
|
|
bool edge0IsBoundary = (eBits & 1) != 0;
|
|
bool edge1IsBoundary = (eBits & 2) != 0;
|
|
bool edge2IsBoundary = (eBits & 4) != 0;
|
|
|
|
//
|
|
// Adjust weights for the 4 boundary points and 3 interior points
|
|
// to account for the 3 phantom points adjacent to each
|
|
// boundary edge:
|
|
//
|
|
if (edge0IsBoundary) {
|
|
REAL w0 = weights[0];
|
|
if (edge2IsBoundary) {
|
|
// P0 = B1 + (B1 - I1)
|
|
weights[4] += w0;
|
|
weights[4] += w0;
|
|
weights[8] -= w0;
|
|
} else {
|
|
// P0 = B1 + (B0 - I0)
|
|
weights[4] += w0;
|
|
weights[3] += w0;
|
|
weights[7] -= w0;
|
|
}
|
|
|
|
// P1 = B1 + (B2 - I1)
|
|
REAL w1 = weights[1];
|
|
weights[4] += w1;
|
|
weights[5] += w1;
|
|
weights[8] -= w1;
|
|
|
|
REAL w2 = weights[2];
|
|
if (edge1IsBoundary) {
|
|
// P2 = B2 + (B2 - I1)
|
|
weights[5] += w2;
|
|
weights[5] += w2;
|
|
weights[8] -= w2;
|
|
} else {
|
|
// P2 = B2 + (B3 - I2)
|
|
weights[5] += w2;
|
|
weights[6] += w2;
|
|
weights[9] -= w2;
|
|
}
|
|
// Clear weights for the phantom points:
|
|
weights[0] = weights[1] = weights[2] = 0.0f;
|
|
}
|
|
if (edge1IsBoundary) {
|
|
REAL w0 = weights[6];
|
|
if (edge0IsBoundary) {
|
|
// P0 = B1 + (B1 - I1)
|
|
weights[5] += w0;
|
|
weights[5] += w0;
|
|
weights[4] -= w0;
|
|
} else {
|
|
// P0 = B1 + (B0 - I0)
|
|
weights[5] += w0;
|
|
weights[2] += w0;
|
|
weights[1] -= w0;
|
|
}
|
|
|
|
// P1 = B1 + (B2 - I1)
|
|
REAL w1 = weights[9];
|
|
weights[5] += w1;
|
|
weights[8] += w1;
|
|
weights[4] -= w1;
|
|
|
|
REAL w2 = weights[11];
|
|
if (edge2IsBoundary) {
|
|
// P2 = B2 + (B2 - I1)
|
|
weights[8] += w2;
|
|
weights[8] += w2;
|
|
weights[4] -= w2;
|
|
} else {
|
|
// P2 = B2 + (B3 - I2)
|
|
weights[8] += w2;
|
|
weights[10] += w2;
|
|
weights[7] -= w2;
|
|
}
|
|
// Clear weights for the phantom points:
|
|
weights[6] = weights[9] = weights[11] = 0.0f;
|
|
}
|
|
if (edge2IsBoundary) {
|
|
REAL w0 = weights[10];
|
|
if (edge1IsBoundary) {
|
|
// P0 = B1 + (B1 - I1)
|
|
weights[8] += w0;
|
|
weights[8] += w0;
|
|
weights[5] -= w0;
|
|
} else {
|
|
// P0 = B1 + (B0 - I0)
|
|
weights[8] += w0;
|
|
weights[11] += w0;
|
|
weights[9] -= w0;
|
|
}
|
|
|
|
// P1 = B1 + (B2 - I1)
|
|
REAL w1 = weights[7];
|
|
weights[8] += w1;
|
|
weights[4] += w1;
|
|
weights[5] -= w1;
|
|
|
|
REAL w2 = weights[3];
|
|
if (edge0IsBoundary) {
|
|
// P2 = B2 + (B2 - I1)
|
|
weights[4] += w2;
|
|
weights[4] += w2;
|
|
weights[5] -= w2;
|
|
} else {
|
|
// P2 = B2 + (B3 - I2)
|
|
weights[4] += w2;
|
|
weights[0] += w2;
|
|
weights[1] -= w2;
|
|
}
|
|
// Clear weights for the phantom points:
|
|
weights[10] = weights[7] = weights[3] = 0.0f;
|
|
}
|
|
|
|
//
|
|
// Adjust weights for the 3 boundary points and the 2 interior
|
|
// points to account for the 2 phantom points adjacent to
|
|
// each boundary vertex:
|
|
//
|
|
if ((vBits & 1) != 0) {
|
|
// P0 = B1 + (B0 - I0)
|
|
REAL w0 = weights[3];
|
|
weights[4] += w0;
|
|
weights[7] += w0;
|
|
weights[8] -= w0;
|
|
|
|
// P1 = B1 + (B2 - I1)
|
|
REAL w1 = weights[0];
|
|
weights[4] += w1;
|
|
weights[1] += w1;
|
|
weights[5] -= w1;
|
|
|
|
// Clear weights for the phantom points:
|
|
weights[3] = weights[0] = 0.0f;
|
|
}
|
|
if ((vBits & 2) != 0) {
|
|
// P0 = B1 + (B0 - I0)
|
|
REAL w0 = weights[2];
|
|
weights[5] += w0;
|
|
weights[1] += w0;
|
|
weights[4] -= w0;
|
|
|
|
// P1 = B1 + (B2 - I1)
|
|
REAL w1 = weights[6];
|
|
weights[5] += w1;
|
|
weights[9] += w1;
|
|
weights[8] -= w1;
|
|
|
|
// Clear weights for the phantom points:
|
|
weights[2] = weights[6] = 0.0f;
|
|
}
|
|
if ((vBits & 4) != 0) {
|
|
// P0 = B1 + (B0 - I0)
|
|
REAL w0 = weights[11];
|
|
weights[8] += w0;
|
|
weights[9] += w0;
|
|
weights[5] -= w0;
|
|
|
|
// P1 = B1 + (B2 - I1)
|
|
REAL w1 = weights[10];
|
|
weights[8] += w1;
|
|
weights[7] += w1;
|
|
weights[4] -= w1;
|
|
|
|
// Clear weights for the phantom points:
|
|
weights[11] = weights[10] = 0.0f;
|
|
}
|
|
}
|
|
|
|
template <typename REAL>
|
|
void
|
|
boundBasisBoxSplineTri(int boundary,
|
|
REAL wP[12], REAL wDs[12], REAL wDt[12],
|
|
REAL wDss[12], REAL wDst[12], REAL wDtt[12]) {
|
|
|
|
if (wP) {
|
|
adjustBoxSplineTriBoundaryWeights(boundary, wP);
|
|
}
|
|
if (wDs && wDt) {
|
|
adjustBoxSplineTriBoundaryWeights(boundary, wDs);
|
|
adjustBoxSplineTriBoundaryWeights(boundary, wDt);
|
|
|
|
if (wDss && wDst && wDtt) {
|
|
adjustBoxSplineTriBoundaryWeights(boundary, wDss);
|
|
adjustBoxSplineTriBoundaryWeights(boundary, wDst);
|
|
adjustBoxSplineTriBoundaryWeights(boundary, wDtt);
|
|
}
|
|
}
|
|
}
|
|
} // namespace
|
|
|
|
template <typename REAL>
|
|
int EvalBasisBoxSplineTri(REAL s, REAL t,
|
|
REAL wP[12], REAL wDs[12], REAL wDt[12],
|
|
REAL wDss[12], REAL wDst[12], REAL wDtt[12]) {
|
|
|
|
REAL stMonomials[15];
|
|
evalBivariateMonomialsQuartic(s, t, stMonomials);
|
|
|
|
if (wP) {
|
|
evalBoxSplineTriDerivWeights<REAL>(stMonomials, 0, 0, wP);
|
|
}
|
|
if (wDs && wDt) {
|
|
evalBoxSplineTriDerivWeights(stMonomials, 1, 0, wDs);
|
|
evalBoxSplineTriDerivWeights(stMonomials, 0, 1, wDt);
|
|
|
|
if (wDss && wDst && wDtt) {
|
|
evalBoxSplineTriDerivWeights(stMonomials, 2, 0, wDss);
|
|
evalBoxSplineTriDerivWeights(stMonomials, 1, 1, wDst);
|
|
evalBoxSplineTriDerivWeights(stMonomials, 0, 2, wDtt);
|
|
}
|
|
}
|
|
return 12;
|
|
}
|
|
|
|
|
|
//
|
|
// Quartic Bezier triangle:
|
|
//
|
|
// The regular patch for Loop subdivision is a quartic triangular Box spline
|
|
// with cubic boundaries. So we need a quartic Bezier patch to represent it
|
|
// faithfully.
|
|
//
|
|
// The formulae for the 15 quartic basis functions are:
|
|
//
|
|
// 4! i j k
|
|
// B (u,v,w) = ------- * (u * v * w )
|
|
// ijk i!j!k!
|
|
//
|
|
// for each i + j + k = 4. The control points (P) and correspondingly
|
|
// labeled p<i,j,k> are oriented as follows:
|
|
//
|
|
// P14 p040
|
|
// P12 P13 p031 p130
|
|
// P9 P10 P11 p022 p121 p220
|
|
// P5 P6 P7 P8 p013 p112 p211 p310
|
|
// P0 P1 P2 P3 P4 p004 p103 p202 p301 p400
|
|
//
|
|
namespace {
|
|
template <typename REAL>
|
|
void
|
|
evalBezierTriDerivWeights(REAL s, REAL t, int ds, int dt, REAL wB[]) {
|
|
|
|
REAL u = s;
|
|
REAL v = t;
|
|
REAL w = 1 - u - v;
|
|
|
|
REAL uu = u * u;
|
|
REAL vv = v * v;
|
|
REAL ww = w * w;
|
|
|
|
REAL uv = u * v;
|
|
REAL vw = v * w;
|
|
REAL uw = u * w;
|
|
|
|
int totalOrder = ds + dt;
|
|
if (totalOrder == 0) {
|
|
wB[0] = ww * ww;
|
|
wB[1] = 4 * uw * ww;
|
|
wB[2] = 6 * uw * uw;
|
|
wB[3] = 4 * uw * uu;
|
|
wB[4] = uu * uu;
|
|
wB[5] = 4 * vw * ww;
|
|
wB[6] = 12 * ww * uv;
|
|
wB[7] = 12 * uu * vw;
|
|
wB[8] = 4 * uv * uu;
|
|
wB[9] = 6 * vw * vw;
|
|
wB[10] = 12 * vv * uw;
|
|
wB[11] = 6 * uv * uv;
|
|
wB[12] = 4 * vw * vv;
|
|
wB[13] = 4 * uv * vv;
|
|
wB[14] = vv * vv;
|
|
} else if (totalOrder == 1) {
|
|
if (ds == 1) {
|
|
wB[0] = -4 * ww * w;
|
|
wB[1] = 4 * ww * (w - 3 * u);
|
|
wB[2] = 12 * uw * (w - u);
|
|
wB[3] = 4 * uu * (3 * w - u);
|
|
wB[4] = 4 * uu * u;
|
|
wB[5] = -12 * vw * w;
|
|
wB[6] = 12 * vw * (w - 2 * u);
|
|
wB[7] = 12 * uv * (2 * w - u);
|
|
wB[8] = 12 * uv * u;
|
|
wB[9] = -12 * vv * w;
|
|
wB[10] = 12 * vv * (w - u);
|
|
wB[11] = 12 * vv * u;
|
|
wB[12] = -4 * vv * v;
|
|
wB[13] = 4 * vv * v;
|
|
wB[14] = 0;
|
|
} else {
|
|
wB[0] = -4 * ww * w;
|
|
wB[1] = -12 * ww * u;
|
|
wB[2] = -12 * uu * w;
|
|
wB[3] = -4 * uu * u;
|
|
wB[4] = 0;
|
|
wB[5] = 4 * ww * (w - 3 * v);
|
|
wB[6] = 12 * uw * (w - 2 * v);
|
|
wB[7] = 12 * uu * (w - v);
|
|
wB[8] = 4 * uu * u;
|
|
wB[9] = 12 * vw * (w - v);
|
|
wB[10] = 12 * uv * (2 * w - v);
|
|
wB[11] = 12 * uv * u;;
|
|
wB[12] = 4 * vv * (3 * w - v);
|
|
wB[13] = 12 * vv * u;
|
|
wB[14] = 4 * vv * v;
|
|
}
|
|
} else if (totalOrder == 2) {
|
|
if (ds == 2) {
|
|
wB[0] = 12 * ww;
|
|
wB[1] = 24 * (uw - ww);
|
|
wB[2] = 12 * (uu - 4 * uw + ww);
|
|
wB[3] = 24 * (uw - uu);
|
|
wB[4] = 12 * uu;
|
|
wB[5] = 24 * vw;
|
|
wB[6] = 24 * (uv - 2 * vw);
|
|
wB[7] = 24 * (vw - 2 * uv);
|
|
wB[8] = 24 * uv;
|
|
wB[9] = 12 * vv;
|
|
wB[10] = -24 * vv;
|
|
wB[11] = 12 * vv;
|
|
wB[12] = 0;
|
|
wB[13] = 0;
|
|
wB[14] = 0;
|
|
} else if (dt == 2) {
|
|
wB[0] = 12 * ww;
|
|
wB[1] = 24 * uw;
|
|
wB[2] = 12 * uu;
|
|
wB[3] = 0;
|
|
wB[4] = 0;
|
|
wB[5] = 24 * (vw - ww);
|
|
wB[6] = 24 * (uv - 2 * uw);
|
|
wB[7] = -24 * uu;
|
|
wB[8] = 0;
|
|
wB[9] = 12 * (vv - 4 * vw + ww);
|
|
wB[10] = 24 * (uw - 2 * uv);
|
|
wB[11] = 12 * uu;
|
|
wB[12] = 24 * (vw - vv);
|
|
wB[13] = 24 * uv;
|
|
wB[14] = 12 * vv;
|
|
} else {
|
|
wB[0] = 12 * ww;
|
|
wB[3] = -12 * uu;
|
|
wB[13] = 12 * vv;
|
|
wB[11] = 24 * uv;
|
|
wB[1] = 24 * uw - wB[0];
|
|
wB[2] = -24 * uw - wB[3];
|
|
wB[5] = 24 * vw - wB[0];
|
|
wB[6] = -24 * vw + wB[11] - wB[1];
|
|
wB[8] = - wB[3];
|
|
wB[7] = -(wB[11] + wB[2]);
|
|
wB[9] = wB[13] - wB[5] - wB[0];
|
|
wB[10] = -(wB[9] + wB[11]);
|
|
wB[12] = - wB[13];
|
|
wB[4] = 0;
|
|
wB[14] = 0;
|
|
}
|
|
} else {
|
|
assert(totalOrder <= 2);
|
|
}
|
|
}
|
|
} // end namespace
|
|
|
|
template <typename REAL>
|
|
int
|
|
EvalBasisBezierTri(REAL s, REAL t,
|
|
REAL wP[15], REAL wDs[15], REAL wDt[15],
|
|
REAL wDss[15], REAL wDst[15], REAL wDtt[15]) {
|
|
|
|
if (wP) {
|
|
evalBezierTriDerivWeights<REAL>(s, t, 0, 0, wP);
|
|
}
|
|
if (wDs && wDt) {
|
|
evalBezierTriDerivWeights(s, t, 1, 0, wDs);
|
|
evalBezierTriDerivWeights(s, t, 0, 1, wDt);
|
|
|
|
if (wDss && wDst && wDtt) {
|
|
evalBezierTriDerivWeights(s, t, 2, 0, wDss);
|
|
evalBezierTriDerivWeights(s, t, 1, 1, wDst);
|
|
evalBezierTriDerivWeights(s, t, 0, 2, wDtt);
|
|
}
|
|
}
|
|
return 15;
|
|
}
|
|
|
|
|
|
//
|
|
// Quartic Gregory triangle:
|
|
//
|
|
// The 18-point quaritic Gregory patch is an extension of the 15-point
|
|
// quartic Bezier triangle with the 3 interior points of the Bezier patch
|
|
// replaced with pairs of points (face points -- fi+ and fi-) that are
|
|
// rationally combined.
|
|
//
|
|
// The point ordering of Gregory patches deviates considerably from the
|
|
// BSpline and Bezier patches by grouping the 5 points at each corner and
|
|
// ordering the groups by corner index. This is consistent with the cubic
|
|
// Gregory quad patch.
|
|
//
|
|
// The 3 additional quartic boundary points are currently appended to these
|
|
// 3 groups of 5 control points. In contrast to the 5 points associated
|
|
// with each corner, these 3 points are more associated with the edge
|
|
// between the corner vertices and are equally weighted between the two.
|
|
//
|
|
namespace {
|
|
//
|
|
// Expanding a set of 15 Bezier basis functions for the 6 (3 pairs) of
|
|
// rational weights for the 18 Gregory basis functions:
|
|
//
|
|
template <typename REAL>
|
|
void
|
|
convertBezierWeightsToGregory(REAL const wB[15], REAL const rG[6], REAL wG[18]) {
|
|
|
|
wG[0] = wB[0];
|
|
wG[1] = wB[1];
|
|
wG[2] = wB[5];
|
|
wG[3] = wB[6] * rG[0];
|
|
wG[4] = wB[6] * rG[1];
|
|
|
|
wG[5] = wB[4];
|
|
wG[6] = wB[8];
|
|
wG[7] = wB[3];
|
|
wG[8] = wB[7] * rG[2];
|
|
wG[9] = wB[7] * rG[3];
|
|
|
|
wG[10] = wB[14];
|
|
wG[11] = wB[12];
|
|
wG[12] = wB[13];
|
|
wG[13] = wB[10] * rG[4];
|
|
wG[14] = wB[10] * rG[5];
|
|
|
|
wG[15] = wB[2];
|
|
wG[16] = wB[11];
|
|
wG[17] = wB[9];
|
|
}
|
|
} // end namespace
|
|
|
|
template <typename REAL>
|
|
int
|
|
EvalBasisGregoryTri(REAL s, REAL t,
|
|
REAL wP[18], REAL wDs[18], REAL wDt[18],
|
|
REAL wDss[18], REAL wDst[18], REAL wDtt[18]) {
|
|
|
|
//
|
|
// Bezier basis functions are denoted with B while the rational multipliers for the
|
|
// interior points will be denoted G -- so we have B(s,t) and G(s,t) (though we
|
|
// switch to barycentric (u,v,w) briefly to compute G)
|
|
//
|
|
REAL BP[15], BDs[15], BDt[15], BDss[15], BDst[15], BDtt[15];
|
|
|
|
REAL G[6] = { 1.0f, 0.0f, 1.0f, 0.0f, 1.0f, 0.0f };
|
|
REAL u = s;
|
|
REAL v = t;
|
|
REAL w = 1 - u - v;
|
|
|
|
if ((u + v) > 0) {
|
|
G[0] = u / (u + v);
|
|
G[1] = v / (u + v);
|
|
}
|
|
if ((v + w) > 0) {
|
|
G[2] = v / (v + w);
|
|
G[3] = w / (v + w);
|
|
}
|
|
if ((w + u) > 0) {
|
|
G[4] = w / (w + u);
|
|
G[5] = u / (w + u);
|
|
}
|
|
|
|
//
|
|
// Compute Bezier basis functions and convert, adjusting interior points:
|
|
//
|
|
if (wP) {
|
|
evalBezierTriDerivWeights<REAL>(s, t, 0, 0, BP);
|
|
convertBezierWeightsToGregory(BP, G, wP);
|
|
}
|
|
if (wDs && wDt) {
|
|
// TBD -- ifdef OPENSUBDIV_GREGORY_EVAL_TRUE_DERIVATIVES
|
|
|
|
evalBezierTriDerivWeights(s, t, 1, 0, BDs);
|
|
evalBezierTriDerivWeights(s, t, 0, 1, BDt);
|
|
|
|
convertBezierWeightsToGregory(BDs, G, wDs);
|
|
convertBezierWeightsToGregory(BDt, G, wDt);
|
|
|
|
if (wDss && wDst && wDtt) {
|
|
evalBezierTriDerivWeights(s, t, 2, 0, BDss);
|
|
evalBezierTriDerivWeights(s, t, 1, 1, BDst);
|
|
evalBezierTriDerivWeights(s, t, 0, 2, BDtt);
|
|
|
|
convertBezierWeightsToGregory(BDss, G, wDss);
|
|
convertBezierWeightsToGregory(BDst, G, wDst);
|
|
convertBezierWeightsToGregory(BDtt, G, wDtt);
|
|
}
|
|
}
|
|
return 18;
|
|
}
|
|
|
|
//
|
|
// Higher level basis evaluation functions that deal with parameterization and
|
|
// boundary issues (reflected in PatchParam) for all patch types:
|
|
//
|
|
template <typename REAL>
|
|
int
|
|
EvaluatePatchBasisNormalized(int patchType, PatchParam const & param, REAL s, REAL t,
|
|
REAL wP[], REAL wDs[], REAL wDt[],
|
|
REAL wDss[], REAL wDst[], REAL wDtt[]) {
|
|
|
|
int boundaryMask = param.GetBoundary();
|
|
|
|
int nPoints = 0;
|
|
if (patchType == PatchDescriptor::REGULAR) {
|
|
nPoints = EvalBasisBSpline(s, t, wP, wDs, wDt, wDss, wDst, wDtt);
|
|
if (boundaryMask) {
|
|
boundBasisBSpline(boundaryMask, wP, wDs, wDt, wDss, wDst, wDtt);
|
|
}
|
|
} else if (patchType == PatchDescriptor::LOOP) {
|
|
nPoints = EvalBasisBoxSplineTri(s, t, wP, wDs, wDt, wDss, wDst, wDtt);
|
|
if (boundaryMask) {
|
|
boundBasisBoxSplineTri(boundaryMask, wP, wDs, wDt, wDss, wDst, wDtt);
|
|
}
|
|
} else if (patchType == PatchDescriptor::GREGORY_BASIS) {
|
|
nPoints = EvalBasisGregory(s, t, wP, wDs, wDt, wDss, wDst, wDtt);
|
|
} else if (patchType == PatchDescriptor::GREGORY_TRIANGLE) {
|
|
nPoints = EvalBasisGregoryTri(s, t, wP, wDs, wDt, wDss, wDst, wDtt);
|
|
} else if (patchType == PatchDescriptor::QUADS) {
|
|
nPoints = EvalBasisLinear(s, t, wP, wDs, wDt, wDss, wDst, wDtt);
|
|
} else if (patchType == PatchDescriptor::TRIANGLES) {
|
|
nPoints = EvalBasisLinearTri(s, t, wP, wDs, wDt, wDss, wDst, wDtt);
|
|
} else {
|
|
assert(0);
|
|
}
|
|
return nPoints;
|
|
}
|
|
|
|
template <typename REAL>
|
|
int
|
|
EvaluatePatchBasis(int patchType, PatchParam const & param, REAL s, REAL t,
|
|
REAL wP[], REAL wDs[], REAL wDt[],
|
|
REAL wDss[], REAL wDst[], REAL wDtt[]) {
|
|
|
|
REAL derivSign = 1.0f;
|
|
|
|
if ((patchType == PatchDescriptor::LOOP) ||
|
|
(patchType == PatchDescriptor::GREGORY_TRIANGLE) ||
|
|
(patchType == PatchDescriptor::TRIANGLES)) {
|
|
param.NormalizeTriangle(s, t);
|
|
if (param.IsTriangleRotated()) {
|
|
derivSign = -1.0f;
|
|
}
|
|
} else {
|
|
param.Normalize(s, t);
|
|
}
|
|
|
|
int nPoints = EvaluatePatchBasisNormalized(
|
|
patchType, param, s, t, wP, wDs, wDt, wDss, wDst, wDtt);
|
|
|
|
if (wDs && wDt) {
|
|
REAL d1Scale = derivSign * (REAL)(1 << param.GetDepth());
|
|
|
|
for (int i = 0; i < nPoints; ++i) {
|
|
wDs[i] *= d1Scale;
|
|
wDt[i] *= d1Scale;
|
|
}
|
|
|
|
if (wDss && wDst && wDtt) {
|
|
REAL d2Scale = derivSign * d1Scale * d1Scale;
|
|
|
|
for (int i = 0; i < nPoints; ++i) {
|
|
wDss[i] *= d2Scale;
|
|
wDst[i] *= d2Scale;
|
|
wDtt[i] *= d2Scale;
|
|
}
|
|
}
|
|
}
|
|
return nPoints;
|
|
}
|
|
|
|
//
|
|
// Explicit float and double instantiations:
|
|
//
|
|
template int EvaluatePatchBasisNormalized<float>(int patchType, PatchParam const & param,
|
|
float s, float t, float wP[], float wDs[], float wDt[], float wDss[], float wDst[], float wDtt[]);
|
|
template int EvaluatePatchBasis<float>(int patchType, PatchParam const & param,
|
|
float s, float t, float wP[], float wDs[], float wDt[], float wDss[], float wDst[], float wDtt[]);
|
|
|
|
template int EvaluatePatchBasisNormalized<double>(int patchType, PatchParam const & param,
|
|
double s, double t, double wP[], double wDs[], double wDt[], double wDss[], double wDst[], double wDtt[]);
|
|
template int EvaluatePatchBasis<double>(int patchType, PatchParam const & param,
|
|
double s, double t, double wP[], double wDs[], double wDt[], double wDss[], double wDst[], double wDtt[]);
|
|
|
|
//
|
|
// Most basis evaluation functions are implicitly instantiated above -- Bezier
|
|
// require explicit instantiation as they are not invoked via a patch type:
|
|
//
|
|
template int EvalBasisBezier<float>(float s, float t,
|
|
float wP[16], float wDs[16], float wDt[16], float wDss[16], float wDst[16], float wDtt[16]);
|
|
template int EvalBasisBezierTri<float>(float s, float t,
|
|
float wP[12], float wDs[12], float wDt[12], float wDss[12], float wDst[12], float wDtt[12]);
|
|
|
|
template int EvalBasisBezier<double>(double s, double t,
|
|
double wP[16], double wDs[16], double wDt[16], double wDss[16], double wDst[16], double wDtt[16]);
|
|
template int EvalBasisBezierTri<double>(double s, double t,
|
|
double wP[12], double wDs[12], double wDt[12], double wDss[12], double wDst[12], double wDtt[12]);
|
|
|
|
} // end namespace internal
|
|
} // end namespace Far
|
|
|
|
} // end namespace OPENSUBDIV_VERSION
|
|
} // end namespace OpenSubdiv
|