02674ee414
R=yangguo@chromium.org Review URL: https://codereview.chromium.org/18509003 Patch from Haitao Feng <haitao.feng@intel.com>. git-svn-id: http://v8.googlecode.com/svn/branches/bleeding_edge@15510 ce2b1a6d-e550-0410-aec6-3dcde31c8c00
232 lines
9.4 KiB
C++
232 lines
9.4 KiB
C++
// Copyright 2006-2008 the V8 project authors. All rights reserved.
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// Redistribution and use in source and binary forms, with or without
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// modification, are permitted provided that the following conditions are
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// met:
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//
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// * Redistributions of source code must retain the above copyright
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// notice, this list of conditions and the following disclaimer.
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// * Redistributions in binary form must reproduce the above
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// copyright notice, this list of conditions and the following
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// disclaimer in the documentation and/or other materials provided
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// with the distribution.
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// * Neither the name of Google Inc. nor the names of its
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// contributors may be used to endorse or promote products derived
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// from this software without specific prior written permission.
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//
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// THIS SOFTWARE IS PROVIDED BY THE COPYRIGHT HOLDERS AND CONTRIBUTORS
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// "AS IS" AND ANY EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT
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// LIMITED TO, THE IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS FOR
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// A PARTICULAR PURPOSE ARE DISCLAIMED. IN NO EVENT SHALL THE COPYRIGHT
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// OWNER OR CONTRIBUTORS BE LIABLE FOR ANY DIRECT, INDIRECT, INCIDENTAL,
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// SPECIAL, EXEMPLARY, OR CONSEQUENTIAL DAMAGES (INCLUDING, BUT NOT
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// LIMITED TO, PROCUREMENT OF SUBSTITUTE GOODS OR SERVICES; LOSS OF USE,
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// DATA, OR PROFITS; OR BUSINESS INTERRUPTION) HOWEVER CAUSED AND ON ANY
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// THEORY OF LIABILITY, WHETHER IN CONTRACT, STRICT LIABILITY, OR TORT
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// (INCLUDING NEGLIGENCE OR OTHERWISE) ARISING IN ANY WAY OUT OF THE USE
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// OF THIS SOFTWARE, EVEN IF ADVISED OF THE POSSIBILITY OF SUCH DAMAGE.
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#include <stdlib.h>
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#include "v8.h"
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#include "platform.h"
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#include "cctest.h"
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#include "diy-fp.h"
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#include "double.h"
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using namespace v8::internal;
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TEST(Uint64Conversions) {
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// Start by checking the byte-order.
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uint64_t ordered = V8_2PART_UINT64_C(0x01234567, 89ABCDEF);
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CHECK_EQ(3512700564088504e-318, Double(ordered).value());
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uint64_t min_double64 = V8_2PART_UINT64_C(0x00000000, 00000001);
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CHECK_EQ(5e-324, Double(min_double64).value());
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uint64_t max_double64 = V8_2PART_UINT64_C(0x7fefffff, ffffffff);
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CHECK_EQ(1.7976931348623157e308, Double(max_double64).value());
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}
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TEST(AsDiyFp) {
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uint64_t ordered = V8_2PART_UINT64_C(0x01234567, 89ABCDEF);
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DiyFp diy_fp = Double(ordered).AsDiyFp();
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CHECK_EQ(0x12 - 0x3FF - 52, diy_fp.e());
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// The 52 mantissa bits, plus the implicit 1 in bit 52 as a UINT64.
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CHECK(V8_2PART_UINT64_C(0x00134567, 89ABCDEF) == diy_fp.f()); // NOLINT
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uint64_t min_double64 = V8_2PART_UINT64_C(0x00000000, 00000001);
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diy_fp = Double(min_double64).AsDiyFp();
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CHECK_EQ(-0x3FF - 52 + 1, diy_fp.e());
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// This is a denormal; so no hidden bit.
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CHECK(1 == diy_fp.f()); // NOLINT
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uint64_t max_double64 = V8_2PART_UINT64_C(0x7fefffff, ffffffff);
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diy_fp = Double(max_double64).AsDiyFp();
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CHECK_EQ(0x7FE - 0x3FF - 52, diy_fp.e());
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CHECK(V8_2PART_UINT64_C(0x001fffff, ffffffff) == diy_fp.f()); // NOLINT
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}
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TEST(AsNormalizedDiyFp) {
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uint64_t ordered = V8_2PART_UINT64_C(0x01234567, 89ABCDEF);
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DiyFp diy_fp = Double(ordered).AsNormalizedDiyFp();
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CHECK_EQ(0x12 - 0x3FF - 52 - 11, diy_fp.e());
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CHECK((V8_2PART_UINT64_C(0x00134567, 89ABCDEF) << 11) ==
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diy_fp.f()); // NOLINT
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uint64_t min_double64 = V8_2PART_UINT64_C(0x00000000, 00000001);
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diy_fp = Double(min_double64).AsNormalizedDiyFp();
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CHECK_EQ(-0x3FF - 52 + 1 - 63, diy_fp.e());
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// This is a denormal; so no hidden bit.
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CHECK(V8_2PART_UINT64_C(0x80000000, 00000000) == diy_fp.f()); // NOLINT
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uint64_t max_double64 = V8_2PART_UINT64_C(0x7fefffff, ffffffff);
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diy_fp = Double(max_double64).AsNormalizedDiyFp();
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CHECK_EQ(0x7FE - 0x3FF - 52 - 11, diy_fp.e());
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CHECK((V8_2PART_UINT64_C(0x001fffff, ffffffff) << 11) ==
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diy_fp.f()); // NOLINT
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}
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TEST(IsDenormal) {
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uint64_t min_double64 = V8_2PART_UINT64_C(0x00000000, 00000001);
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CHECK(Double(min_double64).IsDenormal());
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uint64_t bits = V8_2PART_UINT64_C(0x000FFFFF, FFFFFFFF);
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CHECK(Double(bits).IsDenormal());
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bits = V8_2PART_UINT64_C(0x00100000, 00000000);
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CHECK(!Double(bits).IsDenormal());
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}
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TEST(IsSpecial) {
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CHECK(Double(V8_INFINITY).IsSpecial());
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CHECK(Double(-V8_INFINITY).IsSpecial());
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CHECK(Double(OS::nan_value()).IsSpecial());
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uint64_t bits = V8_2PART_UINT64_C(0xFFF12345, 00000000);
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CHECK(Double(bits).IsSpecial());
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// Denormals are not special:
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CHECK(!Double(5e-324).IsSpecial());
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CHECK(!Double(-5e-324).IsSpecial());
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// And some random numbers:
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CHECK(!Double(0.0).IsSpecial());
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CHECK(!Double(-0.0).IsSpecial());
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CHECK(!Double(1.0).IsSpecial());
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CHECK(!Double(-1.0).IsSpecial());
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CHECK(!Double(1000000.0).IsSpecial());
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CHECK(!Double(-1000000.0).IsSpecial());
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CHECK(!Double(1e23).IsSpecial());
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CHECK(!Double(-1e23).IsSpecial());
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CHECK(!Double(1.7976931348623157e308).IsSpecial());
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CHECK(!Double(-1.7976931348623157e308).IsSpecial());
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}
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TEST(IsInfinite) {
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CHECK(Double(V8_INFINITY).IsInfinite());
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CHECK(Double(-V8_INFINITY).IsInfinite());
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CHECK(!Double(OS::nan_value()).IsInfinite());
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CHECK(!Double(0.0).IsInfinite());
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CHECK(!Double(-0.0).IsInfinite());
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CHECK(!Double(1.0).IsInfinite());
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CHECK(!Double(-1.0).IsInfinite());
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uint64_t min_double64 = V8_2PART_UINT64_C(0x00000000, 00000001);
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CHECK(!Double(min_double64).IsInfinite());
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}
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TEST(Sign) {
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CHECK_EQ(1, Double(1.0).Sign());
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CHECK_EQ(1, Double(V8_INFINITY).Sign());
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CHECK_EQ(-1, Double(-V8_INFINITY).Sign());
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CHECK_EQ(1, Double(0.0).Sign());
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CHECK_EQ(-1, Double(-0.0).Sign());
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uint64_t min_double64 = V8_2PART_UINT64_C(0x00000000, 00000001);
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CHECK_EQ(1, Double(min_double64).Sign());
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}
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TEST(NormalizedBoundaries) {
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DiyFp boundary_plus;
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DiyFp boundary_minus;
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DiyFp diy_fp = Double(1.5).AsNormalizedDiyFp();
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Double(1.5).NormalizedBoundaries(&boundary_minus, &boundary_plus);
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CHECK_EQ(diy_fp.e(), boundary_minus.e());
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CHECK_EQ(diy_fp.e(), boundary_plus.e());
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// 1.5 does not have a significand of the form 2^p (for some p).
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// Therefore its boundaries are at the same distance.
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CHECK(diy_fp.f() - boundary_minus.f() == boundary_plus.f() - diy_fp.f());
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CHECK((1 << 10) == diy_fp.f() - boundary_minus.f()); // NOLINT
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diy_fp = Double(1.0).AsNormalizedDiyFp();
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Double(1.0).NormalizedBoundaries(&boundary_minus, &boundary_plus);
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CHECK_EQ(diy_fp.e(), boundary_minus.e());
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CHECK_EQ(diy_fp.e(), boundary_plus.e());
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// 1.0 does have a significand of the form 2^p (for some p).
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// Therefore its lower boundary is twice as close as the upper boundary.
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CHECK_GT(boundary_plus.f() - diy_fp.f(), diy_fp.f() - boundary_minus.f());
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CHECK((1 << 9) == diy_fp.f() - boundary_minus.f()); // NOLINT
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CHECK((1 << 10) == boundary_plus.f() - diy_fp.f()); // NOLINT
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uint64_t min_double64 = V8_2PART_UINT64_C(0x00000000, 00000001);
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diy_fp = Double(min_double64).AsNormalizedDiyFp();
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Double(min_double64).NormalizedBoundaries(&boundary_minus, &boundary_plus);
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CHECK_EQ(diy_fp.e(), boundary_minus.e());
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CHECK_EQ(diy_fp.e(), boundary_plus.e());
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// min-value does not have a significand of the form 2^p (for some p).
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// Therefore its boundaries are at the same distance.
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CHECK(diy_fp.f() - boundary_minus.f() == boundary_plus.f() - diy_fp.f());
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// Denormals have their boundaries much closer.
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CHECK((static_cast<uint64_t>(1) << 62) ==
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diy_fp.f() - boundary_minus.f()); // NOLINT
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uint64_t smallest_normal64 = V8_2PART_UINT64_C(0x00100000, 00000000);
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diy_fp = Double(smallest_normal64).AsNormalizedDiyFp();
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Double(smallest_normal64).NormalizedBoundaries(&boundary_minus,
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&boundary_plus);
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CHECK_EQ(diy_fp.e(), boundary_minus.e());
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CHECK_EQ(diy_fp.e(), boundary_plus.e());
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// Even though the significand is of the form 2^p (for some p), its boundaries
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// are at the same distance. (This is the only exception).
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CHECK(diy_fp.f() - boundary_minus.f() == boundary_plus.f() - diy_fp.f());
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CHECK((1 << 10) == diy_fp.f() - boundary_minus.f()); // NOLINT
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uint64_t largest_denormal64 = V8_2PART_UINT64_C(0x000FFFFF, FFFFFFFF);
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diy_fp = Double(largest_denormal64).AsNormalizedDiyFp();
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Double(largest_denormal64).NormalizedBoundaries(&boundary_minus,
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&boundary_plus);
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CHECK_EQ(diy_fp.e(), boundary_minus.e());
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CHECK_EQ(diy_fp.e(), boundary_plus.e());
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CHECK(diy_fp.f() - boundary_minus.f() == boundary_plus.f() - diy_fp.f());
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CHECK((1 << 11) == diy_fp.f() - boundary_minus.f()); // NOLINT
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uint64_t max_double64 = V8_2PART_UINT64_C(0x7fefffff, ffffffff);
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diy_fp = Double(max_double64).AsNormalizedDiyFp();
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Double(max_double64).NormalizedBoundaries(&boundary_minus, &boundary_plus);
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CHECK_EQ(diy_fp.e(), boundary_minus.e());
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CHECK_EQ(diy_fp.e(), boundary_plus.e());
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// max-value does not have a significand of the form 2^p (for some p).
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// Therefore its boundaries are at the same distance.
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CHECK(diy_fp.f() - boundary_minus.f() == boundary_plus.f() - diy_fp.f());
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CHECK((1 << 10) == diy_fp.f() - boundary_minus.f()); // NOLINT
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}
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TEST(NextDouble) {
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CHECK_EQ(4e-324, Double(0.0).NextDouble());
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CHECK_EQ(0.0, Double(-0.0).NextDouble());
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CHECK_EQ(-0.0, Double(-4e-324).NextDouble());
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Double d0(-4e-324);
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Double d1(d0.NextDouble());
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Double d2(d1.NextDouble());
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CHECK_EQ(-0.0, d1.value());
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CHECK_EQ(0.0, d2.value());
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CHECK_EQ(4e-324, d2.NextDouble());
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CHECK_EQ(-1.7976931348623157e308, Double(-V8_INFINITY).NextDouble());
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CHECK_EQ(V8_INFINITY,
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Double(V8_2PART_UINT64_C(0x7fefffff, ffffffff)).NextDouble());
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}
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