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152 lines
4.6 KiB
152 lines
4.6 KiB
1 month ago
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'use strict';
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// based on Shewchuk's algorithm for exactly floating point addition
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// adapted from https://github.com/tc39/proposal-math-sum/blob/3513d58323a1ae25560e8700aa5294500c6c9287/polyfill/polyfill.mjs
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var $ = require('../internals/export');
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var uncurryThis = require('../internals/function-uncurry-this');
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var iterate = require('../internals/iterate');
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var $RangeError = RangeError;
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var $TypeError = TypeError;
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var $Infinity = Infinity;
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var $NaN = NaN;
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var abs = Math.abs;
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var pow = Math.pow;
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var push = uncurryThis([].push);
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var POW_2_1023 = pow(2, 1023);
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var MAX_SAFE_INTEGER = pow(2, 53) - 1; // 2 ** 53 - 1 === 9007199254740992
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var MAX_DOUBLE = Number.MAX_VALUE; // 2 ** 1024 - 2 ** (1023 - 52) === 1.79769313486231570815e+308
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var MAX_ULP = pow(2, 971); // 2 ** (1023 - 52) === 1.99584030953471981166e+292
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var NOT_A_NUMBER = {};
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var MINUS_INFINITY = {};
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var PLUS_INFINITY = {};
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var MINUS_ZERO = {};
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var FINITE = {};
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// prerequisite: abs(x) >= abs(y)
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var twosum = function (x, y) {
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var hi = x + y;
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var lo = y - (hi - x);
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return { hi: hi, lo: lo };
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};
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// `Math.sumPrecise` method
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// https://github.com/tc39/proposal-math-sum
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$({ target: 'Math', stat: true, forced: true }, {
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// eslint-disable-next-line max-statements -- ok
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sumPrecise: function sumPrecise(items) {
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var numbers = [];
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var count = 0;
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var state = MINUS_ZERO;
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iterate(items, function (n) {
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if (++count >= MAX_SAFE_INTEGER) throw new $RangeError('Maximum allowed index exceeded');
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if (typeof n != 'number') throw new $TypeError('Value is not a number');
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if (state !== NOT_A_NUMBER) {
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// eslint-disable-next-line no-self-compare -- NaN check
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if (n !== n) state = NOT_A_NUMBER;
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else if (n === $Infinity) state = state === MINUS_INFINITY ? NOT_A_NUMBER : PLUS_INFINITY;
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else if (n === -$Infinity) state = state === PLUS_INFINITY ? NOT_A_NUMBER : MINUS_INFINITY;
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else if ((n !== 0 || (1 / n) === $Infinity) && (state === MINUS_ZERO || state === FINITE)) {
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state = FINITE;
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push(numbers, n);
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}
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}
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});
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switch (state) {
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case NOT_A_NUMBER: return $NaN;
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case MINUS_INFINITY: return -$Infinity;
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case PLUS_INFINITY: return $Infinity;
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case MINUS_ZERO: return -0;
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}
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var partials = [];
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var overflow = 0; // conceptually 2 ** 1024 times this value; the final partial is biased by this amount
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var x, y, sum, hi, lo, tmp;
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for (var i = 0; i < numbers.length; i++) {
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x = numbers[i];
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var actuallyUsedPartials = 0;
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for (var j = 0; j < partials.length; j++) {
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y = partials[j];
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if (abs(x) < abs(y)) {
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tmp = x;
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x = y;
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y = tmp;
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}
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sum = twosum(x, y);
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hi = sum.hi;
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lo = sum.lo;
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if (abs(hi) === $Infinity) {
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var sign = hi === $Infinity ? 1 : -1;
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overflow += sign;
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x = (x - (sign * POW_2_1023)) - (sign * POW_2_1023);
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if (abs(x) < abs(y)) {
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tmp = x;
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x = y;
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y = tmp;
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}
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sum = twosum(x, y);
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hi = sum.hi;
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lo = sum.lo;
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}
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if (lo !== 0) partials[actuallyUsedPartials++] = lo;
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x = hi;
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}
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partials.length = actuallyUsedPartials;
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if (x !== 0) push(partials, x);
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}
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// compute the exact sum of partials, stopping once we lose precision
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var n = partials.length - 1;
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hi = 0;
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lo = 0;
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if (overflow !== 0) {
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var next = n >= 0 ? partials[n] : 0;
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n--;
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if (abs(overflow) > 1 || (overflow > 0 && next > 0) || (overflow < 0 && next < 0)) {
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return overflow > 0 ? $Infinity : -$Infinity;
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}
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// here we actually have to do the arithmetic
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// drop a factor of 2 so we can do it without overflow
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// assert(abs(overflow) === 1)
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sum = twosum(overflow * POW_2_1023, next / 2);
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hi = sum.hi;
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lo = sum.lo;
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lo *= 2;
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if (abs(2 * hi) === $Infinity) {
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// rounding to the maximum value
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if (hi > 0) {
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return (hi === POW_2_1023 && lo === -(MAX_ULP / 2) && n >= 0 && partials[n] < 0) ? MAX_DOUBLE : $Infinity;
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} return (hi === -POW_2_1023 && lo === (MAX_ULP / 2) && n >= 0 && partials[n] > 0) ? -MAX_DOUBLE : -$Infinity;
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}
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if (lo !== 0) {
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partials[++n] = lo;
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lo = 0;
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}
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hi *= 2;
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}
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while (n >= 0) {
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sum = twosum(hi, partials[n--]);
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hi = sum.hi;
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lo = sum.lo;
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if (lo !== 0) break;
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}
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if (n >= 0 && ((lo < 0 && partials[n] < 0) || (lo > 0 && partials[n] > 0))) {
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y = lo * 2;
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x = hi + y;
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if (y === x - hi) hi = x;
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}
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return hi;
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}
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});
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