/* -*- Mode: C++; tab-width: 8; indent-tabs-mode: nil; c-basic-offset: 4 -*- * vim: set ts=8 sts=4 et sw=4 tw=99: * This Source Code Form is subject to the terms of the Mozilla Public * License, v. 2.0. If a copy of the MPL was not distributed with this * file, You can obtain one at http://mozilla.org/MPL/2.0/. */ /* * Portable double to alphanumeric string and back converters. */ #include "jsdtoa.h" #include "jstypes.h" #include "jsprf.h" #include "jsutil.h" using namespace js; #ifdef IS_LITTLE_ENDIAN #define IEEE_8087 #else #define IEEE_MC68k #endif #ifndef Long #define Long int32_t #endif #ifndef ULong #define ULong uint32_t #endif /* #ifndef Llong #define Llong int64_t #endif #ifndef ULlong #define ULlong uint64_t #endif */ /* * MALLOC gets declared external, and that doesn't work for class members, so * wrap. */ inline void* dtoa_malloc(size_t size) { return js_malloc(size); } inline void dtoa_free(void* p) { return js_free(p); } #define NO_GLOBAL_STATE #define MALLOC dtoa_malloc #define FREE dtoa_free #include "dtoa.c" /* Mapping of JSDToStrMode -> js_dtoa mode */ static const uint8_t dtoaModes[] = { 0, /* DTOSTR_STANDARD */ 0, /* DTOSTR_STANDARD_EXPONENTIAL, */ 3, /* DTOSTR_FIXED, */ 2, /* DTOSTR_EXPONENTIAL, */ 2}; /* DTOSTR_PRECISION */ double js_strtod_harder(DtoaState *state, const char *s00, char **se, int *err) { double retval; if (err) *err = 0; retval = _strtod(state, s00, se); return retval; } char * js_dtostr(DtoaState *state, char *buffer, size_t bufferSize, JSDToStrMode mode, int precision, double dinput) { U d; int decPt; /* Offset of decimal point from first digit */ int sign; /* Nonzero if the sign bit was set in d */ int nDigits; /* Number of significand digits returned by js_dtoa */ char *numBegin; /* Pointer to the digits returned by js_dtoa */ char *numEnd = 0; /* Pointer past the digits returned by js_dtoa */ JS_ASSERT(bufferSize >= (size_t)(mode <= DTOSTR_STANDARD_EXPONENTIAL ? DTOSTR_STANDARD_BUFFER_SIZE : DTOSTR_VARIABLE_BUFFER_SIZE(precision))); /* * Change mode here rather than below because the buffer may not be large * enough to hold a large integer. */ if (mode == DTOSTR_FIXED && (dinput >= 1e21 || dinput <= -1e21)) mode = DTOSTR_STANDARD; dval(d) = dinput; numBegin = dtoa(PASS_STATE d, dtoaModes[mode], precision, &decPt, &sign, &numEnd); if (!numBegin) { return NULL; } nDigits = numEnd - numBegin; JS_ASSERT((size_t) nDigits <= bufferSize - 2); if ((size_t) nDigits > bufferSize - 2) { return NULL; } js_memcpy(buffer + 2, numBegin, nDigits); freedtoa(PASS_STATE numBegin); numBegin = buffer + 2; /* +2 leaves space for sign and/or decimal point */ numEnd = numBegin + nDigits; *numEnd = '\0'; /* If Infinity, -Infinity, or NaN, return the string regardless of mode. */ if (decPt != 9999) { JSBool exponentialNotation = JS_FALSE; int minNDigits = 0; /* Min number of significant digits required */ char *p; char *q; switch (mode) { case DTOSTR_STANDARD: if (decPt < -5 || decPt > 21) exponentialNotation = JS_TRUE; else minNDigits = decPt; break; case DTOSTR_FIXED: if (precision >= 0) minNDigits = decPt + precision; else minNDigits = decPt; break; case DTOSTR_EXPONENTIAL: JS_ASSERT(precision > 0); minNDigits = precision; /* Fall through */ case DTOSTR_STANDARD_EXPONENTIAL: exponentialNotation = JS_TRUE; break; case DTOSTR_PRECISION: JS_ASSERT(precision > 0); minNDigits = precision; if (decPt < -5 || decPt > precision) exponentialNotation = JS_TRUE; break; } /* If the number has fewer than minNDigits, end-pad it with zeros. */ if (nDigits < minNDigits) { p = numBegin + minNDigits; nDigits = minNDigits; do { *numEnd++ = '0'; } while (numEnd != p); *numEnd = '\0'; } if (exponentialNotation) { /* Insert a decimal point if more than one significand digit */ if (nDigits != 1) { numBegin--; numBegin[0] = numBegin[1]; numBegin[1] = '.'; } JS_snprintf(numEnd, bufferSize - (numEnd - buffer), "e%+d", decPt-1); } else if (decPt != nDigits) { /* Some kind of a fraction in fixed notation */ JS_ASSERT(decPt <= nDigits); if (decPt > 0) { /* dd...dd . dd...dd */ p = --numBegin; do { *p = p[1]; p++; } while (--decPt); *p = '.'; } else { /* 0 . 00...00dd...dd */ p = numEnd; numEnd += 1 - decPt; q = numEnd; JS_ASSERT(numEnd < buffer + bufferSize); *numEnd = '\0'; while (p != numBegin) *--q = *--p; for (p = numBegin + 1; p != q; p++) *p = '0'; *numBegin = '.'; *--numBegin = '0'; } } } /* If negative and neither -0.0 nor NaN, output a leading '-'. */ if (sign && !(word0(d) == Sign_bit && word1(d) == 0) && !((word0(d) & Exp_mask) == Exp_mask && (word1(d) || (word0(d) & Frac_mask)))) { *--numBegin = '-'; } return numBegin; } /* Let b = floor(b / divisor), and return the remainder. b must be nonnegative. * divisor must be between 1 and 65536. * This function cannot run out of memory. */ static uint32_t divrem(Bigint *b, uint32_t divisor) { int32_t n = b->wds; uint32_t remainder = 0; ULong *bx; ULong *bp; JS_ASSERT(divisor > 0 && divisor <= 65536); if (!n) return 0; /* b is zero */ bx = b->x; bp = bx + n; do { ULong a = *--bp; ULong dividend = remainder << 16 | a >> 16; ULong quotientHi = dividend / divisor; ULong quotientLo; remainder = dividend - quotientHi*divisor; JS_ASSERT(quotientHi <= 0xFFFF && remainder < divisor); dividend = remainder << 16 | (a & 0xFFFF); quotientLo = dividend / divisor; remainder = dividend - quotientLo*divisor; JS_ASSERT(quotientLo <= 0xFFFF && remainder < divisor); *bp = quotientHi << 16 | quotientLo; } while (bp != bx); /* Decrease the size of the number if its most significant word is now zero. */ if (bx[n-1] == 0) b->wds--; return remainder; } /* Return floor(b/2^k) and set b to be the remainder. The returned quotient must be less than 2^32. */ static uint32_t quorem2(Bigint *b, int32_t k) { ULong mask; ULong result; ULong *bx, *bxe; int32_t w; int32_t n = k >> 5; k &= 0x1F; mask = (1<wds - n; if (w <= 0) return 0; JS_ASSERT(w <= 2); bx = b->x; bxe = bx + n; result = *bxe >> k; *bxe &= mask; if (w == 2) { JS_ASSERT(!(bxe[1] & ~mask)); if (k) result |= bxe[1] << (32 - k); } n++; while (!*bxe && bxe != bx) { n--; bxe--; } b->wds = n; return result; } /* "-0.0000...(1073 zeros after decimal point)...0001\0" is the longest string that we could produce, * which occurs when printing -5e-324 in binary. We could compute a better estimate of the size of * the output string and malloc fewer bytes depending on d and base, but why bother? */ #define DTOBASESTR_BUFFER_SIZE 1078 #define BASEDIGIT(digit) ((char)(((digit) >= 10) ? 'a' - 10 + (digit) : '0' + (digit))) char * js_dtobasestr(DtoaState *state, int base, double dinput) { U d; char *buffer; /* The output string */ char *p; /* Pointer to current position in the buffer */ char *pInt; /* Pointer to the beginning of the integer part of the string */ char *q; uint32_t digit; U di; /* d truncated to an integer */ U df; /* The fractional part of d */ JS_ASSERT(base >= 2 && base <= 36); dval(d) = dinput; buffer = (char*) js_malloc(DTOBASESTR_BUFFER_SIZE); if (!buffer) return NULL; p = buffer; if (dval(d) < 0.0 #if defined(XP_WIN) || defined(XP_OS2) && !((word0(d) & Exp_mask) == Exp_mask && ((word0(d) & Frac_mask) || word1(d))) /* Visual C++ doesn't know how to compare against NaN */ #endif ) { *p++ = '-'; dval(d) = -dval(d); } /* Check for Infinity and NaN */ if ((word0(d) & Exp_mask) == Exp_mask) { strcpy(p, !word1(d) && !(word0(d) & Frac_mask) ? "Infinity" : "NaN"); return buffer; } /* Output the integer part of d with the digits in reverse order. */ pInt = p; dval(di) = floor(dval(d)); if (dval(di) <= 4294967295.0) { uint32_t n = (uint32_t)dval(di); if (n) do { uint32_t m = n / base; digit = n - m*base; n = m; JS_ASSERT(digit < (uint32_t)base); *p++ = BASEDIGIT(digit); } while (n); else *p++ = '0'; } else { int e; int bits; /* Number of significant bits in di; not used. */ Bigint *b = d2b(PASS_STATE di, &e, &bits); if (!b) goto nomem1; b = lshift(PASS_STATE b, e); if (!b) { nomem1: Bfree(PASS_STATE b); js_free(buffer); return NULL; } do { digit = divrem(b, base); JS_ASSERT(digit < (uint32_t)base); *p++ = BASEDIGIT(digit); } while (b->wds); Bfree(PASS_STATE b); } /* Reverse the digits of the integer part of d. */ q = p-1; while (q > pInt) { char ch = *pInt; *pInt++ = *q; *q-- = ch; } dval(df) = dval(d) - dval(di); if (dval(df) != 0.0) { /* We have a fraction. */ int e, bbits; int32_t s2, done; Bigint *b, *s, *mlo, *mhi; b = s = mlo = mhi = NULL; *p++ = '.'; b = d2b(PASS_STATE df, &e, &bbits); if (!b) { nomem2: Bfree(PASS_STATE b); Bfree(PASS_STATE s); if (mlo != mhi) Bfree(PASS_STATE mlo); Bfree(PASS_STATE mhi); js_free(buffer); return NULL; } JS_ASSERT(e < 0); /* At this point df = b * 2^e. e must be less than zero because 0 < df < 1. */ s2 = -(int32_t)(word0(d) >> Exp_shift1 & Exp_mask>>Exp_shift1); #ifndef Sudden_Underflow if (!s2) s2 = -1; #endif s2 += Bias + P; /* 1/2^s2 = (nextDouble(d) - d)/2 */ JS_ASSERT(-s2 < e); mlo = i2b(PASS_STATE 1); if (!mlo) goto nomem2; mhi = mlo; if (!word1(d) && !(word0(d) & Bndry_mask) #ifndef Sudden_Underflow && word0(d) & (Exp_mask & Exp_mask << 1) #endif ) { /* The special case. Here we want to be within a quarter of the last input significant digit instead of one half of it when the output string's value is less than d. */ s2 += Log2P; mhi = i2b(PASS_STATE 1< df = b/2^s2 > 0; * (d - prevDouble(d))/2 = mlo/2^s2; * (nextDouble(d) - d)/2 = mhi/2^s2. */ done = JS_FALSE; do { int32_t j, j1; Bigint *delta; b = multadd(PASS_STATE b, base, 0); if (!b) goto nomem2; digit = quorem2(b, s2); if (mlo == mhi) { mlo = mhi = multadd(PASS_STATE mlo, base, 0); if (!mhi) goto nomem2; } else { mlo = multadd(PASS_STATE mlo, base, 0); if (!mlo) goto nomem2; mhi = multadd(PASS_STATE mhi, base, 0); if (!mhi) goto nomem2; } /* Do we yet have the shortest string that will round to d? */ j = cmp(b, mlo); /* j is b/2^s2 compared with mlo/2^s2. */ delta = diff(PASS_STATE s, mhi); if (!delta) goto nomem2; j1 = delta->sign ? 1 : cmp(b, delta); Bfree(PASS_STATE delta); /* j1 is b/2^s2 compared with 1 - mhi/2^s2. */ #ifndef ROUND_BIASED if (j1 == 0 && !(word1(d) & 1)) { if (j > 0) digit++; done = JS_TRUE; } else #endif if (j < 0 || (j == 0 #ifndef ROUND_BIASED && !(word1(d) & 1) #endif )) { if (j1 > 0) { /* Either dig or dig+1 would work here as the least significant digit. Use whichever would produce an output value closer to d. */ b = lshift(PASS_STATE b, 1); if (!b) goto nomem2; j1 = cmp(b, s); if (j1 > 0) /* The even test (|| (j1 == 0 && (digit & 1))) is not here because it messes up odd base output * such as 3.5 in base 3. */ digit++; } done = JS_TRUE; } else if (j1 > 0) { digit++; done = JS_TRUE; } JS_ASSERT(digit < (uint32_t)base); *p++ = BASEDIGIT(digit); } while (!done); Bfree(PASS_STATE b); Bfree(PASS_STATE s); if (mlo != mhi) Bfree(PASS_STATE mlo); Bfree(PASS_STATE mhi); } JS_ASSERT(p < buffer + DTOBASESTR_BUFFER_SIZE); *p = '\0'; return buffer; } DtoaState * js_NewDtoaState() { return newdtoa(); } void js_DestroyDtoaState(DtoaState *state) { destroydtoa(state); }