1// Copyright 2014 The Chromium Authors. All rights reserved. 2// Use of this source code is governed by a BSD-style license that can be 3// found in the LICENSE file. 4 5// Slightly adapted for inclusion in V8. 6// Copyright 2014 the V8 project authors. All rights reserved. 7 8#ifndef V8_BASE_SAFE_MATH_IMPL_H_ 9#define V8_BASE_SAFE_MATH_IMPL_H_ 10 11#include <stdint.h> 12 13#include <cmath> 14#include <cstdlib> 15#include <limits> 16 17#include "src/base/macros.h" 18#include "src/base/safe_conversions.h" 19 20namespace v8 { 21namespace base { 22namespace internal { 23 24 25// From Chromium's base/template_util.h: 26 27template<class T, T v> 28struct integral_constant { 29 static const T value = v; 30 typedef T value_type; 31 typedef integral_constant<T, v> type; 32}; 33 34template <class T, T v> const T integral_constant<T, v>::value; 35 36typedef integral_constant<bool, true> true_type; 37typedef integral_constant<bool, false> false_type; 38 39template <class T, class U> struct is_same : public false_type {}; 40template <class T> struct is_same<T, T> : true_type {}; 41 42template<bool B, class T = void> 43struct enable_if {}; 44 45template<class T> 46struct enable_if<true, T> { typedef T type; }; 47 48// </template_util.h> 49 50 51// Everything from here up to the floating point operations is portable C++, 52// but it may not be fast. This code could be split based on 53// platform/architecture and replaced with potentially faster implementations. 54 55// Integer promotion templates used by the portable checked integer arithmetic. 56template <size_t Size, bool IsSigned> 57struct IntegerForSizeAndSign; 58template <> 59struct IntegerForSizeAndSign<1, true> { 60 typedef int8_t type; 61}; 62template <> 63struct IntegerForSizeAndSign<1, false> { 64 typedef uint8_t type; 65}; 66template <> 67struct IntegerForSizeAndSign<2, true> { 68 typedef int16_t type; 69}; 70template <> 71struct IntegerForSizeAndSign<2, false> { 72 typedef uint16_t type; 73}; 74template <> 75struct IntegerForSizeAndSign<4, true> { 76 typedef int32_t type; 77}; 78template <> 79struct IntegerForSizeAndSign<4, false> { 80 typedef uint32_t type; 81}; 82template <> 83struct IntegerForSizeAndSign<8, true> { 84 typedef int64_t type; 85}; 86template <> 87struct IntegerForSizeAndSign<8, false> { 88 typedef uint64_t type; 89}; 90 91// WARNING: We have no IntegerForSizeAndSign<16, *>. If we ever add one to 92// support 128-bit math, then the ArithmeticPromotion template below will need 93// to be updated (or more likely replaced with a decltype expression). 94 95template <typename Integer> 96struct UnsignedIntegerForSize { 97 typedef typename enable_if< 98 std::numeric_limits<Integer>::is_integer, 99 typename IntegerForSizeAndSign<sizeof(Integer), false>::type>::type type; 100}; 101 102template <typename Integer> 103struct SignedIntegerForSize { 104 typedef typename enable_if< 105 std::numeric_limits<Integer>::is_integer, 106 typename IntegerForSizeAndSign<sizeof(Integer), true>::type>::type type; 107}; 108 109template <typename Integer> 110struct TwiceWiderInteger { 111 typedef typename enable_if< 112 std::numeric_limits<Integer>::is_integer, 113 typename IntegerForSizeAndSign< 114 sizeof(Integer) * 2, 115 std::numeric_limits<Integer>::is_signed>::type>::type type; 116}; 117 118template <typename Integer> 119struct PositionOfSignBit { 120 static const typename enable_if<std::numeric_limits<Integer>::is_integer, 121 size_t>::type value = 8 * sizeof(Integer) - 1; 122}; 123 124// Helper templates for integer manipulations. 125 126template <typename T> 127bool HasSignBit(T x) { 128 // Cast to unsigned since right shift on signed is undefined. 129 return !!(static_cast<typename UnsignedIntegerForSize<T>::type>(x) >> 130 PositionOfSignBit<T>::value); 131} 132 133// This wrapper undoes the standard integer promotions. 134template <typename T> 135T BinaryComplement(T x) { 136 return ~x; 137} 138 139// Here are the actual portable checked integer math implementations. 140// TODO(jschuh): Break this code out from the enable_if pattern and find a clean 141// way to coalesce things into the CheckedNumericState specializations below. 142 143template <typename T> 144typename enable_if<std::numeric_limits<T>::is_integer, T>::type 145CheckedAdd(T x, T y, RangeConstraint* validity) { 146 // Since the value of x+y is undefined if we have a signed type, we compute 147 // it using the unsigned type of the same size. 148 typedef typename UnsignedIntegerForSize<T>::type UnsignedDst; 149 UnsignedDst ux = static_cast<UnsignedDst>(x); 150 UnsignedDst uy = static_cast<UnsignedDst>(y); 151 UnsignedDst uresult = ux + uy; 152 // Addition is valid if the sign of (x + y) is equal to either that of x or 153 // that of y. 154 if (std::numeric_limits<T>::is_signed) { 155 if (HasSignBit(BinaryComplement((uresult ^ ux) & (uresult ^ uy)))) 156 *validity = RANGE_VALID; 157 else // Direction of wrap is inverse of result sign. 158 *validity = HasSignBit(uresult) ? RANGE_OVERFLOW : RANGE_UNDERFLOW; 159 160 } else { // Unsigned is either valid or overflow. 161 *validity = BinaryComplement(x) >= y ? RANGE_VALID : RANGE_OVERFLOW; 162 } 163 return static_cast<T>(uresult); 164} 165 166template <typename T> 167typename enable_if<std::numeric_limits<T>::is_integer, T>::type 168CheckedSub(T x, T y, RangeConstraint* validity) { 169 // Since the value of x+y is undefined if we have a signed type, we compute 170 // it using the unsigned type of the same size. 171 typedef typename UnsignedIntegerForSize<T>::type UnsignedDst; 172 UnsignedDst ux = static_cast<UnsignedDst>(x); 173 UnsignedDst uy = static_cast<UnsignedDst>(y); 174 UnsignedDst uresult = ux - uy; 175 // Subtraction is valid if either x and y have same sign, or (x-y) and x have 176 // the same sign. 177 if (std::numeric_limits<T>::is_signed) { 178 if (HasSignBit(BinaryComplement((uresult ^ ux) & (ux ^ uy)))) 179 *validity = RANGE_VALID; 180 else // Direction of wrap is inverse of result sign. 181 *validity = HasSignBit(uresult) ? RANGE_OVERFLOW : RANGE_UNDERFLOW; 182 183 } else { // Unsigned is either valid or underflow. 184 *validity = x >= y ? RANGE_VALID : RANGE_UNDERFLOW; 185 } 186 return static_cast<T>(uresult); 187} 188 189// Integer multiplication is a bit complicated. In the fast case we just 190// we just promote to a twice wider type, and range check the result. In the 191// slow case we need to manually check that the result won't be truncated by 192// checking with division against the appropriate bound. 193template <typename T> 194typename enable_if< 195 std::numeric_limits<T>::is_integer && sizeof(T) * 2 <= sizeof(uintmax_t), 196 T>::type 197CheckedMul(T x, T y, RangeConstraint* validity) { 198 typedef typename TwiceWiderInteger<T>::type IntermediateType; 199 IntermediateType tmp = 200 static_cast<IntermediateType>(x) * static_cast<IntermediateType>(y); 201 *validity = DstRangeRelationToSrcRange<T>(tmp); 202 return static_cast<T>(tmp); 203} 204 205template <typename T> 206typename enable_if<std::numeric_limits<T>::is_integer && 207 std::numeric_limits<T>::is_signed && 208 (sizeof(T) * 2 > sizeof(uintmax_t)), 209 T>::type 210CheckedMul(T x, T y, RangeConstraint* validity) { 211 // if either side is zero then the result will be zero. 212 if (!(x || y)) { 213 return RANGE_VALID; 214 215 } else if (x > 0) { 216 if (y > 0) 217 *validity = 218 x <= std::numeric_limits<T>::max() / y ? RANGE_VALID : RANGE_OVERFLOW; 219 else 220 *validity = y >= std::numeric_limits<T>::min() / x ? RANGE_VALID 221 : RANGE_UNDERFLOW; 222 223 } else { 224 if (y > 0) 225 *validity = x >= std::numeric_limits<T>::min() / y ? RANGE_VALID 226 : RANGE_UNDERFLOW; 227 else 228 *validity = 229 y >= std::numeric_limits<T>::max() / x ? RANGE_VALID : RANGE_OVERFLOW; 230 } 231 232 return x * y; 233} 234 235template <typename T> 236typename enable_if<std::numeric_limits<T>::is_integer && 237 !std::numeric_limits<T>::is_signed && 238 (sizeof(T) * 2 > sizeof(uintmax_t)), 239 T>::type 240CheckedMul(T x, T y, RangeConstraint* validity) { 241 *validity = (y == 0 || x <= std::numeric_limits<T>::max() / y) 242 ? RANGE_VALID 243 : RANGE_OVERFLOW; 244 return x * y; 245} 246 247// Division just requires a check for an invalid negation on signed min/-1. 248template <typename T> 249T CheckedDiv( 250 T x, 251 T y, 252 RangeConstraint* validity, 253 typename enable_if<std::numeric_limits<T>::is_integer, int>::type = 0) { 254 if (std::numeric_limits<T>::is_signed && x == std::numeric_limits<T>::min() && 255 y == static_cast<T>(-1)) { 256 *validity = RANGE_OVERFLOW; 257 return std::numeric_limits<T>::min(); 258 } 259 260 *validity = RANGE_VALID; 261 return x / y; 262} 263 264template <typename T> 265typename enable_if< 266 std::numeric_limits<T>::is_integer && std::numeric_limits<T>::is_signed, 267 T>::type 268CheckedMod(T x, T y, RangeConstraint* validity) { 269 *validity = y > 0 ? RANGE_VALID : RANGE_INVALID; 270 return x % y; 271} 272 273template <typename T> 274typename enable_if< 275 std::numeric_limits<T>::is_integer && !std::numeric_limits<T>::is_signed, 276 T>::type 277CheckedMod(T x, T y, RangeConstraint* validity) { 278 *validity = RANGE_VALID; 279 return x % y; 280} 281 282template <typename T> 283typename enable_if< 284 std::numeric_limits<T>::is_integer && std::numeric_limits<T>::is_signed, 285 T>::type 286CheckedNeg(T value, RangeConstraint* validity) { 287 *validity = 288 value != std::numeric_limits<T>::min() ? RANGE_VALID : RANGE_OVERFLOW; 289 // The negation of signed min is min, so catch that one. 290 return -value; 291} 292 293template <typename T> 294typename enable_if< 295 std::numeric_limits<T>::is_integer && !std::numeric_limits<T>::is_signed, 296 T>::type 297CheckedNeg(T value, RangeConstraint* validity) { 298 // The only legal unsigned negation is zero. 299 *validity = value ? RANGE_UNDERFLOW : RANGE_VALID; 300 return static_cast<T>( 301 -static_cast<typename SignedIntegerForSize<T>::type>(value)); 302} 303 304template <typename T> 305typename enable_if< 306 std::numeric_limits<T>::is_integer && std::numeric_limits<T>::is_signed, 307 T>::type 308CheckedAbs(T value, RangeConstraint* validity) { 309 *validity = 310 value != std::numeric_limits<T>::min() ? RANGE_VALID : RANGE_OVERFLOW; 311 return std::abs(value); 312} 313 314template <typename T> 315typename enable_if< 316 std::numeric_limits<T>::is_integer && !std::numeric_limits<T>::is_signed, 317 T>::type 318CheckedAbs(T value, RangeConstraint* validity) { 319 // Absolute value of a positive is just its identiy. 320 *validity = RANGE_VALID; 321 return value; 322} 323 324// These are the floating point stubs that the compiler needs to see. Only the 325// negation operation is ever called. 326#define BASE_FLOAT_ARITHMETIC_STUBS(NAME) \ 327 template <typename T> \ 328 typename enable_if<std::numeric_limits<T>::is_iec559, T>::type \ 329 Checked##NAME(T, T, RangeConstraint*) { \ 330 UNREACHABLE(); \ 331 return 0; \ 332 } 333 334BASE_FLOAT_ARITHMETIC_STUBS(Add) 335BASE_FLOAT_ARITHMETIC_STUBS(Sub) 336BASE_FLOAT_ARITHMETIC_STUBS(Mul) 337BASE_FLOAT_ARITHMETIC_STUBS(Div) 338BASE_FLOAT_ARITHMETIC_STUBS(Mod) 339 340#undef BASE_FLOAT_ARITHMETIC_STUBS 341 342template <typename T> 343typename enable_if<std::numeric_limits<T>::is_iec559, T>::type CheckedNeg( 344 T value, 345 RangeConstraint*) { 346 return -value; 347} 348 349template <typename T> 350typename enable_if<std::numeric_limits<T>::is_iec559, T>::type CheckedAbs( 351 T value, 352 RangeConstraint*) { 353 return std::abs(value); 354} 355 356// Floats carry around their validity state with them, but integers do not. So, 357// we wrap the underlying value in a specialization in order to hide that detail 358// and expose an interface via accessors. 359enum NumericRepresentation { 360 NUMERIC_INTEGER, 361 NUMERIC_FLOATING, 362 NUMERIC_UNKNOWN 363}; 364 365template <typename NumericType> 366struct GetNumericRepresentation { 367 static const NumericRepresentation value = 368 std::numeric_limits<NumericType>::is_integer 369 ? NUMERIC_INTEGER 370 : (std::numeric_limits<NumericType>::is_iec559 ? NUMERIC_FLOATING 371 : NUMERIC_UNKNOWN); 372}; 373 374template <typename T, NumericRepresentation type = 375 GetNumericRepresentation<T>::value> 376class CheckedNumericState {}; 377 378// Integrals require quite a bit of additional housekeeping to manage state. 379template <typename T> 380class CheckedNumericState<T, NUMERIC_INTEGER> { 381 private: 382 T value_; 383 RangeConstraint validity_; 384 385 public: 386 template <typename Src, NumericRepresentation type> 387 friend class CheckedNumericState; 388 389 CheckedNumericState() : value_(0), validity_(RANGE_VALID) {} 390 391 template <typename Src> 392 CheckedNumericState(Src value, RangeConstraint validity) 393 : value_(value), 394 validity_(GetRangeConstraint(validity | 395 DstRangeRelationToSrcRange<T>(value))) { 396 // Argument must be numeric. 397 STATIC_ASSERT(std::numeric_limits<Src>::is_specialized); 398 } 399 400 // Copy constructor. 401 template <typename Src> 402 CheckedNumericState(const CheckedNumericState<Src>& rhs) 403 : value_(static_cast<T>(rhs.value())), 404 validity_(GetRangeConstraint( 405 rhs.validity() | DstRangeRelationToSrcRange<T>(rhs.value()))) {} 406 407 template <typename Src> 408 explicit CheckedNumericState( 409 Src value, 410 typename enable_if<std::numeric_limits<Src>::is_specialized, int>::type = 411 0) 412 : value_(static_cast<T>(value)), 413 validity_(DstRangeRelationToSrcRange<T>(value)) {} 414 415 RangeConstraint validity() const { return validity_; } 416 T value() const { return value_; } 417}; 418 419// Floating points maintain their own validity, but need translation wrappers. 420template <typename T> 421class CheckedNumericState<T, NUMERIC_FLOATING> { 422 private: 423 T value_; 424 425 public: 426 template <typename Src, NumericRepresentation type> 427 friend class CheckedNumericState; 428 429 CheckedNumericState() : value_(0.0) {} 430 431 template <typename Src> 432 CheckedNumericState( 433 Src value, 434 RangeConstraint validity, 435 typename enable_if<std::numeric_limits<Src>::is_integer, int>::type = 0) { 436 switch (DstRangeRelationToSrcRange<T>(value)) { 437 case RANGE_VALID: 438 value_ = static_cast<T>(value); 439 break; 440 441 case RANGE_UNDERFLOW: 442 value_ = -std::numeric_limits<T>::infinity(); 443 break; 444 445 case RANGE_OVERFLOW: 446 value_ = std::numeric_limits<T>::infinity(); 447 break; 448 449 case RANGE_INVALID: 450 value_ = std::numeric_limits<T>::quiet_NaN(); 451 break; 452 } 453 } 454 455 template <typename Src> 456 explicit CheckedNumericState( 457 Src value, 458 typename enable_if<std::numeric_limits<Src>::is_specialized, int>::type = 459 0) 460 : value_(static_cast<T>(value)) {} 461 462 // Copy constructor. 463 template <typename Src> 464 CheckedNumericState(const CheckedNumericState<Src>& rhs) 465 : value_(static_cast<T>(rhs.value())) {} 466 467 RangeConstraint validity() const { 468 return GetRangeConstraint(value_ <= std::numeric_limits<T>::max(), 469 value_ >= -std::numeric_limits<T>::max()); 470 } 471 T value() const { return value_; } 472}; 473 474// For integers less than 128-bit and floats 32-bit or larger, we can distil 475// C/C++ arithmetic promotions down to two simple rules: 476// 1. The type with the larger maximum exponent always takes precedence. 477// 2. The resulting type must be promoted to at least an int. 478// The following template specializations implement that promotion logic. 479enum ArithmeticPromotionCategory { 480 LEFT_PROMOTION, 481 RIGHT_PROMOTION, 482 DEFAULT_PROMOTION 483}; 484 485template <typename Lhs, 486 typename Rhs = Lhs, 487 ArithmeticPromotionCategory Promotion = 488 (MaxExponent<Lhs>::value > MaxExponent<Rhs>::value) 489 ? (MaxExponent<Lhs>::value > MaxExponent<int>::value 490 ? LEFT_PROMOTION 491 : DEFAULT_PROMOTION) 492 : (MaxExponent<Rhs>::value > MaxExponent<int>::value 493 ? RIGHT_PROMOTION 494 : DEFAULT_PROMOTION) > 495struct ArithmeticPromotion; 496 497template <typename Lhs, typename Rhs> 498struct ArithmeticPromotion<Lhs, Rhs, LEFT_PROMOTION> { 499 typedef Lhs type; 500}; 501 502template <typename Lhs, typename Rhs> 503struct ArithmeticPromotion<Lhs, Rhs, RIGHT_PROMOTION> { 504 typedef Rhs type; 505}; 506 507template <typename Lhs, typename Rhs> 508struct ArithmeticPromotion<Lhs, Rhs, DEFAULT_PROMOTION> { 509 typedef int type; 510}; 511 512// We can statically check if operations on the provided types can wrap, so we 513// can skip the checked operations if they're not needed. So, for an integer we 514// care if the destination type preserves the sign and is twice the width of 515// the source. 516template <typename T, typename Lhs, typename Rhs> 517struct IsIntegerArithmeticSafe { 518 static const bool value = !std::numeric_limits<T>::is_iec559 && 519 StaticDstRangeRelationToSrcRange<T, Lhs>::value == 520 NUMERIC_RANGE_CONTAINED && 521 sizeof(T) >= (2 * sizeof(Lhs)) && 522 StaticDstRangeRelationToSrcRange<T, Rhs>::value != 523 NUMERIC_RANGE_CONTAINED && 524 sizeof(T) >= (2 * sizeof(Rhs)); 525}; 526 527} // namespace internal 528} // namespace base 529} // namespace v8 530 531#endif // V8_BASE_SAFE_MATH_IMPL_H_ 532