| whesse@chromium.org | cec079d | 2010-03-22 14:44:04 +0000 | [diff] [blame] | 1 | // Copyright 2006-2008 the V8 project authors. All rights reserved. |
| 2 | |
| 3 | #include <stdlib.h> |
| 4 | |
| 5 | #include "v8.h" |
| 6 | |
| 7 | #include "platform.h" |
| 8 | #include "cctest.h" |
| 9 | #include "diy-fp.h" |
| 10 | #include "double.h" |
| 11 | |
| 12 | |
| 13 | using namespace v8::internal; |
| 14 | |
| 15 | |
| 16 | TEST(Uint64Conversions) { |
| 17 | // Start by checking the byte-order. |
| 18 | uint64_t ordered = V8_2PART_UINT64_C(0x01234567, 89ABCDEF); |
| 19 | CHECK_EQ(3512700564088504e-318, Double(ordered).value()); |
| 20 | |
| 21 | uint64_t min_double64 = V8_2PART_UINT64_C(0x00000000, 00000001); |
| 22 | CHECK_EQ(5e-324, Double(min_double64).value()); |
| 23 | |
| 24 | uint64_t max_double64 = V8_2PART_UINT64_C(0x7fefffff, ffffffff); |
| 25 | CHECK_EQ(1.7976931348623157e308, Double(max_double64).value()); |
| 26 | } |
| 27 | |
| 28 | TEST(AsDiyFp) { |
| 29 | uint64_t ordered = V8_2PART_UINT64_C(0x01234567, 89ABCDEF); |
| 30 | DiyFp diy_fp = Double(ordered).AsDiyFp(); |
| 31 | CHECK_EQ(0x12 - 0x3FF - 52, diy_fp.e()); |
| 32 | // The 52 mantissa bits, plus the implicit 1 in bit 52 as a UINT64. |
| 33 | CHECK(V8_2PART_UINT64_C(0x00134567, 89ABCDEF) == diy_fp.f()); // NOLINT |
| 34 | |
| 35 | uint64_t min_double64 = V8_2PART_UINT64_C(0x00000000, 00000001); |
| 36 | diy_fp = Double(min_double64).AsDiyFp(); |
| 37 | CHECK_EQ(-0x3FF - 52 + 1, diy_fp.e()); |
| 38 | // This is a denormal; so no hidden bit. |
| 39 | CHECK(1 == diy_fp.f()); // NOLINT |
| 40 | |
| 41 | uint64_t max_double64 = V8_2PART_UINT64_C(0x7fefffff, ffffffff); |
| 42 | diy_fp = Double(max_double64).AsDiyFp(); |
| 43 | CHECK_EQ(0x7FE - 0x3FF - 52, diy_fp.e()); |
| 44 | CHECK(V8_2PART_UINT64_C(0x001fffff, ffffffff) == diy_fp.f()); // NOLINT |
| 45 | } |
| 46 | |
| 47 | |
| 48 | TEST(AsNormalizedDiyFp) { |
| 49 | uint64_t ordered = V8_2PART_UINT64_C(0x01234567, 89ABCDEF); |
| 50 | DiyFp diy_fp = Double(ordered).AsNormalizedDiyFp(); |
| 51 | CHECK_EQ(0x12 - 0x3FF - 52 - 11, diy_fp.e()); |
| 52 | CHECK((V8_2PART_UINT64_C(0x00134567, 89ABCDEF) << 11) == |
| 53 | diy_fp.f()); // NOLINT |
| 54 | |
| 55 | uint64_t min_double64 = V8_2PART_UINT64_C(0x00000000, 00000001); |
| 56 | diy_fp = Double(min_double64).AsNormalizedDiyFp(); |
| 57 | CHECK_EQ(-0x3FF - 52 + 1 - 63, diy_fp.e()); |
| 58 | // This is a denormal; so no hidden bit. |
| 59 | CHECK(V8_2PART_UINT64_C(0x80000000, 00000000) == diy_fp.f()); // NOLINT |
| 60 | |
| 61 | uint64_t max_double64 = V8_2PART_UINT64_C(0x7fefffff, ffffffff); |
| 62 | diy_fp = Double(max_double64).AsNormalizedDiyFp(); |
| 63 | CHECK_EQ(0x7FE - 0x3FF - 52 - 11, diy_fp.e()); |
| 64 | CHECK((V8_2PART_UINT64_C(0x001fffff, ffffffff) << 11) == |
| 65 | diy_fp.f()); // NOLINT |
| 66 | } |
| 67 | |
| 68 | |
| 69 | TEST(IsDenormal) { |
| 70 | uint64_t min_double64 = V8_2PART_UINT64_C(0x00000000, 00000001); |
| 71 | CHECK(Double(min_double64).IsDenormal()); |
| 72 | uint64_t bits = V8_2PART_UINT64_C(0x000FFFFF, FFFFFFFF); |
| 73 | CHECK(Double(bits).IsDenormal()); |
| 74 | bits = V8_2PART_UINT64_C(0x00100000, 00000000); |
| 75 | CHECK(!Double(bits).IsDenormal()); |
| 76 | } |
| 77 | |
| 78 | |
| 79 | TEST(IsSpecial) { |
| 80 | CHECK(Double(V8_INFINITY).IsSpecial()); |
| 81 | CHECK(Double(-V8_INFINITY).IsSpecial()); |
| 82 | CHECK(Double(OS::nan_value()).IsSpecial()); |
| 83 | uint64_t bits = V8_2PART_UINT64_C(0xFFF12345, 00000000); |
| 84 | CHECK(Double(bits).IsSpecial()); |
| 85 | // Denormals are not special: |
| 86 | CHECK(!Double(5e-324).IsSpecial()); |
| 87 | CHECK(!Double(-5e-324).IsSpecial()); |
| 88 | // And some random numbers: |
| 89 | CHECK(!Double(0.0).IsSpecial()); |
| 90 | CHECK(!Double(-0.0).IsSpecial()); |
| 91 | CHECK(!Double(1.0).IsSpecial()); |
| 92 | CHECK(!Double(-1.0).IsSpecial()); |
| 93 | CHECK(!Double(1000000.0).IsSpecial()); |
| 94 | CHECK(!Double(-1000000.0).IsSpecial()); |
| 95 | CHECK(!Double(1e23).IsSpecial()); |
| 96 | CHECK(!Double(-1e23).IsSpecial()); |
| 97 | CHECK(!Double(1.7976931348623157e308).IsSpecial()); |
| 98 | CHECK(!Double(-1.7976931348623157e308).IsSpecial()); |
| 99 | } |
| 100 | |
| 101 | |
| 102 | TEST(IsInfinite) { |
| 103 | CHECK(Double(V8_INFINITY).IsInfinite()); |
| 104 | CHECK(Double(-V8_INFINITY).IsInfinite()); |
| 105 | CHECK(!Double(OS::nan_value()).IsInfinite()); |
| 106 | CHECK(!Double(0.0).IsInfinite()); |
| 107 | CHECK(!Double(-0.0).IsInfinite()); |
| 108 | CHECK(!Double(1.0).IsInfinite()); |
| 109 | CHECK(!Double(-1.0).IsInfinite()); |
| 110 | uint64_t min_double64 = V8_2PART_UINT64_C(0x00000000, 00000001); |
| 111 | CHECK(!Double(min_double64).IsInfinite()); |
| 112 | } |
| 113 | |
| 114 | |
| 115 | TEST(IsNan) { |
| 116 | CHECK(Double(OS::nan_value()).IsNan()); |
| 117 | uint64_t other_nan = V8_2PART_UINT64_C(0xFFFFFFFF, 00000001); |
| 118 | CHECK(Double(other_nan).IsNan()); |
| 119 | CHECK(!Double(V8_INFINITY).IsNan()); |
| 120 | CHECK(!Double(-V8_INFINITY).IsNan()); |
| 121 | CHECK(!Double(0.0).IsNan()); |
| 122 | CHECK(!Double(-0.0).IsNan()); |
| 123 | CHECK(!Double(1.0).IsNan()); |
| 124 | CHECK(!Double(-1.0).IsNan()); |
| 125 | uint64_t min_double64 = V8_2PART_UINT64_C(0x00000000, 00000001); |
| 126 | CHECK(!Double(min_double64).IsNan()); |
| 127 | } |
| 128 | |
| 129 | |
| 130 | TEST(Sign) { |
| 131 | CHECK_EQ(1, Double(1.0).Sign()); |
| 132 | CHECK_EQ(1, Double(V8_INFINITY).Sign()); |
| 133 | CHECK_EQ(-1, Double(-V8_INFINITY).Sign()); |
| 134 | CHECK_EQ(1, Double(0.0).Sign()); |
| 135 | CHECK_EQ(-1, Double(-0.0).Sign()); |
| 136 | uint64_t min_double64 = V8_2PART_UINT64_C(0x00000000, 00000001); |
| 137 | CHECK_EQ(1, Double(min_double64).Sign()); |
| 138 | } |
| 139 | |
| 140 | |
| 141 | TEST(NormalizedBoundaries) { |
| 142 | DiyFp boundary_plus; |
| 143 | DiyFp boundary_minus; |
| 144 | DiyFp diy_fp = Double(1.5).AsNormalizedDiyFp(); |
| 145 | Double(1.5).NormalizedBoundaries(&boundary_minus, &boundary_plus); |
| 146 | CHECK_EQ(diy_fp.e(), boundary_minus.e()); |
| 147 | CHECK_EQ(diy_fp.e(), boundary_plus.e()); |
| 148 | // 1.5 does not have a significand of the form 2^p (for some p). |
| 149 | // Therefore its boundaries are at the same distance. |
| 150 | CHECK(diy_fp.f() - boundary_minus.f() == boundary_plus.f() - diy_fp.f()); |
| 151 | CHECK((1 << 10) == diy_fp.f() - boundary_minus.f()); // NOLINT |
| 152 | |
| 153 | diy_fp = Double(1.0).AsNormalizedDiyFp(); |
| 154 | Double(1.0).NormalizedBoundaries(&boundary_minus, &boundary_plus); |
| 155 | CHECK_EQ(diy_fp.e(), boundary_minus.e()); |
| 156 | CHECK_EQ(diy_fp.e(), boundary_plus.e()); |
| 157 | // 1.0 does have a significand of the form 2^p (for some p). |
| 158 | // Therefore its lower boundary is twice as close as the upper boundary. |
| 159 | CHECK_GT(boundary_plus.f() - diy_fp.f(), diy_fp.f() - boundary_minus.f()); |
| 160 | CHECK((1 << 9) == diy_fp.f() - boundary_minus.f()); // NOLINT |
| 161 | CHECK((1 << 10) == boundary_plus.f() - diy_fp.f()); // NOLINT |
| 162 | |
| 163 | uint64_t min_double64 = V8_2PART_UINT64_C(0x00000000, 00000001); |
| 164 | diy_fp = Double(min_double64).AsNormalizedDiyFp(); |
| 165 | Double(min_double64).NormalizedBoundaries(&boundary_minus, &boundary_plus); |
| 166 | CHECK_EQ(diy_fp.e(), boundary_minus.e()); |
| 167 | CHECK_EQ(diy_fp.e(), boundary_plus.e()); |
| 168 | // min-value does not have a significand of the form 2^p (for some p). |
| 169 | // Therefore its boundaries are at the same distance. |
| 170 | CHECK(diy_fp.f() - boundary_minus.f() == boundary_plus.f() - diy_fp.f()); |
| 171 | // Denormals have their boundaries much closer. |
| 172 | CHECK((static_cast<uint64_t>(1) << 62) == |
| 173 | diy_fp.f() - boundary_minus.f()); // NOLINT |
| 174 | |
| 175 | uint64_t smallest_normal64 = V8_2PART_UINT64_C(0x00100000, 00000000); |
| 176 | diy_fp = Double(smallest_normal64).AsNormalizedDiyFp(); |
| 177 | Double(smallest_normal64).NormalizedBoundaries(&boundary_minus, |
| 178 | &boundary_plus); |
| 179 | CHECK_EQ(diy_fp.e(), boundary_minus.e()); |
| 180 | CHECK_EQ(diy_fp.e(), boundary_plus.e()); |
| 181 | // Even though the significand is of the form 2^p (for some p), its boundaries |
| 182 | // are at the same distance. (This is the only exception). |
| 183 | CHECK(diy_fp.f() - boundary_minus.f() == boundary_plus.f() - diy_fp.f()); |
| 184 | CHECK((1 << 10) == diy_fp.f() - boundary_minus.f()); // NOLINT |
| 185 | |
| 186 | uint64_t largest_denormal64 = V8_2PART_UINT64_C(0x000FFFFF, FFFFFFFF); |
| 187 | diy_fp = Double(largest_denormal64).AsNormalizedDiyFp(); |
| 188 | Double(largest_denormal64).NormalizedBoundaries(&boundary_minus, |
| 189 | &boundary_plus); |
| 190 | CHECK_EQ(diy_fp.e(), boundary_minus.e()); |
| 191 | CHECK_EQ(diy_fp.e(), boundary_plus.e()); |
| 192 | CHECK(diy_fp.f() - boundary_minus.f() == boundary_plus.f() - diy_fp.f()); |
| 193 | CHECK((1 << 11) == diy_fp.f() - boundary_minus.f()); // NOLINT |
| 194 | |
| 195 | uint64_t max_double64 = V8_2PART_UINT64_C(0x7fefffff, ffffffff); |
| 196 | diy_fp = Double(max_double64).AsNormalizedDiyFp(); |
| 197 | Double(max_double64).NormalizedBoundaries(&boundary_minus, &boundary_plus); |
| 198 | CHECK_EQ(diy_fp.e(), boundary_minus.e()); |
| 199 | CHECK_EQ(diy_fp.e(), boundary_plus.e()); |
| 200 | // max-value does not have a significand of the form 2^p (for some p). |
| 201 | // Therefore its boundaries are at the same distance. |
| 202 | CHECK(diy_fp.f() - boundary_minus.f() == boundary_plus.f() - diy_fp.f()); |
| 203 | CHECK((1 << 10) == diy_fp.f() - boundary_minus.f()); // NOLINT |
| 204 | } |
| ager@chromium.org | 01fe7df | 2010-11-10 11:59:11 +0000 | [diff] [blame] | 205 | |
| 206 | |
| 207 | TEST(NextDouble) { |
| 208 | CHECK_EQ(4e-324, Double(0.0).NextDouble()); |
| 209 | CHECK_EQ(0.0, Double(-0.0).NextDouble()); |
| 210 | CHECK_EQ(-0.0, Double(-4e-324).NextDouble()); |
| 211 | Double d0(-4e-324); |
| 212 | Double d1(d0.NextDouble()); |
| 213 | Double d2(d1.NextDouble()); |
| 214 | CHECK_EQ(-0.0, d1.value()); |
| 215 | CHECK_EQ(0.0, d2.value()); |
| 216 | CHECK_EQ(4e-324, d2.NextDouble()); |
| 217 | CHECK_EQ(-1.7976931348623157e308, Double(-V8_INFINITY).NextDouble()); |
| 218 | CHECK_EQ(V8_INFINITY, |
| 219 | Double(V8_2PART_UINT64_C(0x7fefffff, ffffffff)).NextDouble()); |
| 220 | } |