third_party/protobuf/js/binary/arith.js - src - Git at Google

 // Protocol Buffers - Google's data interchange format
 // Copyright 2008 Google Inc.  All rights reserved.
 // https://developers.google.com/protocol-buffers/
 //
 // Redistribution and use in source and binary forms, with or without
 // modification, are permitted provided that the following conditions are
 // met:
 //
 //     * Redistributions of source code must retain the above copyright
 // notice, this list of conditions and the following disclaimer.
 //     * Redistributions in binary form must reproduce the above
 // copyright notice, this list of conditions and the following disclaimer
 // in the documentation and/or other materials provided with the
 // distribution.
 //     * Neither the name of Google Inc. nor the names of its
 // contributors may be used to endorse or promote products derived from
 // this software without specific prior written permission.
 //
 // THIS SOFTWARE IS PROVIDED BY THE COPYRIGHT HOLDERS AND CONTRIBUTORS
 // "AS IS" AND ANY EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT
 // LIMITED TO, THE IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS FOR
 // A PARTICULAR PURPOSE ARE DISCLAIMED. IN NO EVENT SHALL THE COPYRIGHT
 // OWNER OR CONTRIBUTORS BE LIABLE FOR ANY DIRECT, INDIRECT, INCIDENTAL,
 // SPECIAL, EXEMPLARY, OR CONSEQUENTIAL DAMAGES (INCLUDING, BUT NOT
 // LIMITED TO, PROCUREMENT OF SUBSTITUTE GOODS OR SERVICES; LOSS OF USE,
 // DATA, OR PROFITS; OR BUSINESS INTERRUPTION) HOWEVER CAUSED AND ON ANY
 // THEORY OF LIABILITY, WHETHER IN CONTRACT, STRICT LIABILITY, OR TORT
 // (INCLUDING NEGLIGENCE OR OTHERWISE) ARISING IN ANY WAY OUT OF THE USE
 // OF THIS SOFTWARE, EVEN IF ADVISED OF THE POSSIBILITY OF SUCH DAMAGE.

 /**
  * @fileoverview This file contains helper code used by jspb.utils to
  * handle 64-bit integer conversion to/from strings.
  *
  * @author cfallin@google.com (Chris Fallin)
  *
  * TODO(haberman): move this to javascript/closure/math?
  */

 goog.provide('jspb.arith.Int64');
 goog.provide('jspb.arith.UInt64');

 /**
  * UInt64 implements some 64-bit arithmetic routines necessary for properly
  * handling 64-bit integer fields. It implements lossless integer arithmetic on
  * top of JavaScript's number type, which has only 53 bits of precision, by
  * representing 64-bit integers as two 32-bit halves.
  *
  * @param {number} lo The low 32 bits.
  * @param {number} hi The high 32 bits.
  * @constructor
  */
 jspb.arith.UInt64 = function(lo, hi) {
   /**
    * The low 32 bits.
    * @public {number}
    */
   this.lo = lo;
   /**
    * The high 32 bits.
    * @public {number}
    */
   this.hi = hi;
 };


 /**
  * Compare two 64-bit numbers. Returns -1 if the first is
  * less, +1 if the first is greater, or 0 if both are equal.
  * @param {!jspb.arith.UInt64} other
  * @return {number}
  */
 jspb.arith.UInt64.prototype.cmp = function(other) {
   if (this.hi < other.hi || (this.hi == other.hi && this.lo < other.lo)) {
     return -1;
   } else if (this.hi == other.hi && this.lo == other.lo) {
     return 0;
   } else {
     return 1;
   }
 };


 /**
  * Right-shift this number by one bit.
  * @return {!jspb.arith.UInt64}
  */
 jspb.arith.UInt64.prototype.rightShift = function() {
   var hi = this.hi >>> 1;
   var lo = (this.lo >>> 1) | ((this.hi & 1) << 31);
   return new jspb.arith.UInt64(lo >>> 0, hi >>> 0);
 };


 /**
  * Left-shift this number by one bit.
  * @return {!jspb.arith.UInt64}
  */
 jspb.arith.UInt64.prototype.leftShift = function() {
   var lo = this.lo << 1;
   var hi = (this.hi << 1) | (this.lo >>> 31);
   return new jspb.arith.UInt64(lo >>> 0, hi >>> 0);
 };


 /**
  * Test the MSB.
  * @return {boolean}
  */
 jspb.arith.UInt64.prototype.msb = function() {
   return !!(this.hi & 0x80000000);
 };


 /**
  * Test the LSB.
  * @return {boolean}
  */
 jspb.arith.UInt64.prototype.lsb = function() {
   return !!(this.lo & 1);
 };


 /**
  * Test whether this number is zero.
  * @return {boolean}
  */
 jspb.arith.UInt64.prototype.zero = function() {
   return this.lo == 0 && this.hi == 0;
 };


 /**
  * Add two 64-bit numbers to produce a 64-bit number.
  * @param {!jspb.arith.UInt64} other
  * @return {!jspb.arith.UInt64}
  */
 jspb.arith.UInt64.prototype.add = function(other) {
   var lo = ((this.lo + other.lo) & 0xffffffff) >>> 0;
   var hi =
       (((this.hi + other.hi) & 0xffffffff) >>> 0) +
       (((this.lo + other.lo) >= 0x100000000) ? 1 : 0);
   return new jspb.arith.UInt64(lo >>> 0, hi >>> 0);
 };


 /**
  * Subtract two 64-bit numbers to produce a 64-bit number.
  * @param {!jspb.arith.UInt64} other
  * @return {!jspb.arith.UInt64}
  */
 jspb.arith.UInt64.prototype.sub = function(other) {
   var lo = ((this.lo - other.lo) & 0xffffffff) >>> 0;
   var hi =
       (((this.hi - other.hi) & 0xffffffff) >>> 0) -
       (((this.lo - other.lo) < 0) ? 1 : 0);
   return new jspb.arith.UInt64(lo >>> 0, hi >>> 0);
 };


 /**
  * Multiply two 32-bit numbers to produce a 64-bit number.
  * @param {number} a The first integer:  must be in [0, 2^32-1).
  * @param {number} b The second integer: must be in [0, 2^32-1).
  * @return {!jspb.arith.UInt64}
  */
 jspb.arith.UInt64.mul32x32 = function(a, b) {
   // Directly multiplying two 32-bit numbers may produce up to 64 bits of
   // precision, thus losing precision because of the 53-bit mantissa of
   // JavaScript numbers. So we multiply with 16-bit digits (radix 65536)
   // instead.
   var aLow = (a & 0xffff);
   var aHigh = (a >>> 16);
   var bLow = (b & 0xffff);
   var bHigh = (b >>> 16);
   var productLow =
       // 32-bit result, result bits 0-31, take all 32 bits
       (aLow * bLow) +
       // 32-bit result, result bits 16-47, take bottom 16 as our top 16
       ((aLow * bHigh) & 0xffff) * 0x10000 +
       // 32-bit result, result bits 16-47, take bottom 16 as our top 16
       ((aHigh * bLow) & 0xffff) * 0x10000;
   var productHigh =
       // 32-bit result, result bits 32-63, take all 32 bits
       (aHigh * bHigh) +
       // 32-bit result, result bits 16-47, take top 16 as our bottom 16
       ((aLow * bHigh) >>> 16) +
       // 32-bit result, result bits 16-47, take top 16 as our bottom 16
       ((aHigh * bLow) >>> 16);

   // Carry. Note that we actually have up to *two* carries due to addition of
   // three terms.
   while (productLow >= 0x100000000) {
     productLow -= 0x100000000;
     productHigh += 1;
   }

   return new jspb.arith.UInt64(productLow >>> 0, productHigh >>> 0);
 };


 /**
  * Multiply this number by a 32-bit number, producing a 96-bit number, then
  * truncate the top 32 bits.
  * @param {number} a The multiplier.
  * @return {!jspb.arith.UInt64}
  */
 jspb.arith.UInt64.prototype.mul = function(a) {
   // Produce two parts: at bits 0-63, and 32-95.
   var lo = jspb.arith.UInt64.mul32x32(this.lo, a);
   var hi = jspb.arith.UInt64.mul32x32(this.hi, a);
   // Left-shift hi by 32 bits, truncating its top bits. The parts will then be
   // aligned for addition.
   hi.hi = hi.lo;
   hi.lo = 0;
   return lo.add(hi);
 };


 /**
  * Divide a 64-bit number by a 32-bit number to produce a
  * 64-bit quotient and a 32-bit remainder.
  * @param {number} _divisor
  * @return {Array.<jspb.arith.UInt64>} array of [quotient, remainder],
  * unless divisor is 0, in which case an empty array is returned.
  */
 jspb.arith.UInt64.prototype.div = function(_divisor) {
   if (_divisor == 0) {
     return [];
   }

   // We perform long division using a radix-2 algorithm, for simplicity (i.e.,
   // one bit at a time). TODO: optimize to a radix-2^32 algorithm, taking care
   // to get the variable shifts right.
   var quotient = new jspb.arith.UInt64(0, 0);
   var remainder = new jspb.arith.UInt64(this.lo, this.hi);
   var divisor = new jspb.arith.UInt64(_divisor, 0);
   var unit = new jspb.arith.UInt64(1, 0);

   // Left-shift the divisor and unit until the high bit of divisor is set.
   while (!divisor.msb()) {
     divisor = divisor.leftShift();
     unit = unit.leftShift();
   }

   // Perform long division one bit at a time.
   while (!unit.zero()) {
     // If divisor < remainder, add unit to quotient and subtract divisor from
     // remainder.
     if (divisor.cmp(remainder) <= 0) {
       quotient = quotient.add(unit);
       remainder = remainder.sub(divisor);
     }
     // Right-shift the divisor and unit.
     divisor = divisor.rightShift();
     unit = unit.rightShift();
   }

   return [quotient, remainder];
 };


 /**
  * Convert a 64-bit number to a string.
  * @return {string}
  * @override
  */
 jspb.arith.UInt64.prototype.toString = function() {
   var result = '';
   var num = this;
   while (!num.zero()) {
     var divResult = num.div(10);
     var quotient = divResult[0], remainder = divResult[1];
     result = remainder.lo + result;
     num = quotient;
   }
   if (result == '') {
     result = '0';
   }
   return result;
 };


 /**
  * Parse a string into a 64-bit number. Returns `null` on a parse error.
  * @param {string} s
  * @return {?jspb.arith.UInt64}
  */
 jspb.arith.UInt64.fromString = function(s) {
   var result = new jspb.arith.UInt64(0, 0);
   // optimization: reuse this instance for each digit.
   var digit64 = new jspb.arith.UInt64(0, 0);
   for (var i = 0; i < s.length; i++) {
     if (s[i] < '0' || s[i] > '9') {
       return null;
     }
     var digit = parseInt(s[i], 10);
     digit64.lo = digit;
     result = result.mul(10).add(digit64);
   }
   return result;
 };


 /**
  * Make a copy of the uint64.
  * @return {!jspb.arith.UInt64}
  */
 jspb.arith.UInt64.prototype.clone = function() {
   return new jspb.arith.UInt64(this.lo, this.hi);
 };


 /**
  * Int64 is like UInt64, but modifies string conversions to interpret the stored
  * 64-bit value as a twos-complement-signed integer. It does *not* support the
  * full range of operations that UInt64 does: only add, subtract, and string
  * conversions.
  *
  * N.B. that multiply and divide routines are *NOT* supported. They will throw
  * exceptions. (They are not necessary to implement string conversions, which
  * are the only operations we really need in jspb.)
  *
  * @param {number} lo The low 32 bits.
  * @param {number} hi The high 32 bits.
  * @constructor
  */
 jspb.arith.Int64 = function(lo, hi) {
   /**
    * The low 32 bits.
    * @public {number}
    */
   this.lo = lo;
   /**
    * The high 32 bits.
    * @public {number}
    */
   this.hi = hi;
 };


 /**
  * Add two 64-bit numbers to produce a 64-bit number.
  * @param {!jspb.arith.Int64} other
  * @return {!jspb.arith.Int64}
  */
 jspb.arith.Int64.prototype.add = function(other) {
   var lo = ((this.lo + other.lo) & 0xffffffff) >>> 0;
   var hi =
       (((this.hi + other.hi) & 0xffffffff) >>> 0) +
       (((this.lo + other.lo) >= 0x100000000) ? 1 : 0);
   return new jspb.arith.Int64(lo >>> 0, hi >>> 0);
 };


 /**
  * Subtract two 64-bit numbers to produce a 64-bit number.
  * @param {!jspb.arith.Int64} other
  * @return {!jspb.arith.Int64}
  */
 jspb.arith.Int64.prototype.sub = function(other) {
   var lo = ((this.lo - other.lo) & 0xffffffff) >>> 0;
   var hi =
       (((this.hi - other.hi) & 0xffffffff) >>> 0) -
       (((this.lo - other.lo) < 0) ? 1 : 0);
   return new jspb.arith.Int64(lo >>> 0, hi >>> 0);
 };


 /**
  * Make a copy of the int64.
  * @return {!jspb.arith.Int64}
  */
 jspb.arith.Int64.prototype.clone = function() {
   return new jspb.arith.Int64(this.lo, this.hi);
 };


 /**
  * Convert a 64-bit number to a string.
  * @return {string}
  * @override
  */
 jspb.arith.Int64.prototype.toString = function() {
   // If the number is negative, find its twos-complement inverse.
   var sign = (this.hi & 0x80000000) != 0;
   var num = new jspb.arith.UInt64(this.lo, this.hi);
   if (sign) {
     num = new jspb.arith.UInt64(0, 0).sub(num);
   }
   return (sign ? '-' : '') + num.toString();
 };


 /**
  * Parse a string into a 64-bit number. Returns `null` on a parse error.
  * @param {string} s
  * @return {?jspb.arith.Int64}
  */
 jspb.arith.Int64.fromString = function(s) {
   var hasNegative = (s.length > 0 && s[0] == '-');
   if (hasNegative) {
     s = s.substring(1);
   }
   var num = jspb.arith.UInt64.fromString(s);
   if (num === null) {
     return null;
   }
   if (hasNegative) {
     num = new jspb.arith.UInt64(0, 0).sub(num);
   }
   return new jspb.arith.Int64(num.lo, num.hi);
 };
	// Protocol Buffers - Google's data interchange format
	// Copyright 2008 Google Inc. All rights reserved.
	// https://developers.google.com/protocol-buffers/
	//
	// Redistribution and use in source and binary forms, with or without
	// modification, are permitted provided that the following conditions are
	// met:
	//
	// * Redistributions of source code must retain the above copyright
	// notice, this list of conditions and the following disclaimer.
	// * Redistributions in binary form must reproduce the above
	// copyright notice, this list of conditions and the following disclaimer
	// in the documentation and/or other materials provided with the
	// distribution.
	// * Neither the name of Google Inc. nor the names of its
	// contributors may be used to endorse or promote products derived from
	// this software without specific prior written permission.
	//
	// THIS SOFTWARE IS PROVIDED BY THE COPYRIGHT HOLDERS AND CONTRIBUTORS
	// "AS IS" AND ANY EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT
	// LIMITED TO, THE IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS FOR
	// A PARTICULAR PURPOSE ARE DISCLAIMED. IN NO EVENT SHALL THE COPYRIGHT
	// OWNER OR CONTRIBUTORS BE LIABLE FOR ANY DIRECT, INDIRECT, INCIDENTAL,
	// SPECIAL, EXEMPLARY, OR CONSEQUENTIAL DAMAGES (INCLUDING, BUT NOT
	// LIMITED TO, PROCUREMENT OF SUBSTITUTE GOODS OR SERVICES; LOSS OF USE,
	// DATA, OR PROFITS; OR BUSINESS INTERRUPTION) HOWEVER CAUSED AND ON ANY
	// THEORY OF LIABILITY, WHETHER IN CONTRACT, STRICT LIABILITY, OR TORT
	// (INCLUDING NEGLIGENCE OR OTHERWISE) ARISING IN ANY WAY OUT OF THE USE
	// OF THIS SOFTWARE, EVEN IF ADVISED OF THE POSSIBILITY OF SUCH DAMAGE.

	/**
	* @fileoverview This file contains helper code used by jspb.utils to
	* handle 64-bit integer conversion to/from strings.
	*
	* @author cfallin@google.com (Chris Fallin)
	*
	* TODO(haberman): move this to javascript/closure/math?
	*/

	goog.provide('jspb.arith.Int64');
	goog.provide('jspb.arith.UInt64');

	/**
	* UInt64 implements some 64-bit arithmetic routines necessary for properly
	* handling 64-bit integer fields. It implements lossless integer arithmetic on
	* top of JavaScript's number type, which has only 53 bits of precision, by
	* representing 64-bit integers as two 32-bit halves.
	*
	* @param {number} lo The low 32 bits.
	* @param {number} hi The high 32 bits.
	* @constructor
	*/
	jspb.arith.UInt64 = function(lo, hi) {
	/**
	* The low 32 bits.
	* @public {number}
	*/
	this.lo = lo;
	/**
	* The high 32 bits.
	* @public {number}
	*/
	this.hi = hi;
	};


	/**
	* Compare two 64-bit numbers. Returns -1 if the first is
	* less, +1 if the first is greater, or 0 if both are equal.
	* @param {!jspb.arith.UInt64} other
	* @return {number}
	*/
	jspb.arith.UInt64.prototype.cmp = function(other) {
	if (this.hi < other.hi \|\| (this.hi == other.hi && this.lo < other.lo)) {
	return -1;
	} else if (this.hi == other.hi && this.lo == other.lo) {
	return 0;
	} else {
	return 1;
	}
	};


	/**
	* Right-shift this number by one bit.
	* @return {!jspb.arith.UInt64}
	*/
	jspb.arith.UInt64.prototype.rightShift = function() {
	var hi = this.hi >>> 1;
	var lo = (this.lo >>> 1) \| ((this.hi & 1) << 31);
	return new jspb.arith.UInt64(lo >>> 0, hi >>> 0);
	};


	/**
	* Left-shift this number by one bit.
	* @return {!jspb.arith.UInt64}
	*/
	jspb.arith.UInt64.prototype.leftShift = function() {
	var lo = this.lo << 1;
	var hi = (this.hi << 1) \| (this.lo >>> 31);
	return new jspb.arith.UInt64(lo >>> 0, hi >>> 0);
	};


	/**
	* Test the MSB.
	* @return {boolean}
	*/
	jspb.arith.UInt64.prototype.msb = function() {
	return !!(this.hi & 0x80000000);
	};


	/**
	* Test the LSB.
	* @return {boolean}
	*/
	jspb.arith.UInt64.prototype.lsb = function() {
	return !!(this.lo & 1);
	};


	/**
	* Test whether this number is zero.
	* @return {boolean}
	*/
	jspb.arith.UInt64.prototype.zero = function() {
	return this.lo == 0 && this.hi == 0;
	};


	/**
	* Add two 64-bit numbers to produce a 64-bit number.
	* @param {!jspb.arith.UInt64} other
	* @return {!jspb.arith.UInt64}
	*/
	jspb.arith.UInt64.prototype.add = function(other) {
	var lo = ((this.lo + other.lo) & 0xffffffff) >>> 0;
	var hi =
	(((this.hi + other.hi) & 0xffffffff) >>> 0) +
	(((this.lo + other.lo) >= 0x100000000) ? 1 : 0);
	return new jspb.arith.UInt64(lo >>> 0, hi >>> 0);
	};


	/**
	* Subtract two 64-bit numbers to produce a 64-bit number.
	* @param {!jspb.arith.UInt64} other
	* @return {!jspb.arith.UInt64}
	*/
	jspb.arith.UInt64.prototype.sub = function(other) {
	var lo = ((this.lo - other.lo) & 0xffffffff) >>> 0;
	var hi =
	(((this.hi - other.hi) & 0xffffffff) >>> 0) -
	(((this.lo - other.lo) < 0) ? 1 : 0);
	return new jspb.arith.UInt64(lo >>> 0, hi >>> 0);
	};


	/**
	* Multiply two 32-bit numbers to produce a 64-bit number.
	* @param {number} a The first integer: must be in [0, 2^32-1).
	* @param {number} b The second integer: must be in [0, 2^32-1).
	* @return {!jspb.arith.UInt64}
	*/
	jspb.arith.UInt64.mul32x32 = function(a, b) {
	// Directly multiplying two 32-bit numbers may produce up to 64 bits of
	// precision, thus losing precision because of the 53-bit mantissa of
	// JavaScript numbers. So we multiply with 16-bit digits (radix 65536)
	// instead.
	var aLow = (a & 0xffff);
	var aHigh = (a >>> 16);
	var bLow = (b & 0xffff);
	var bHigh = (b >>> 16);
	var productLow =
	// 32-bit result, result bits 0-31, take all 32 bits
	(aLow * bLow) +
	// 32-bit result, result bits 16-47, take bottom 16 as our top 16
	((aLow * bHigh) & 0xffff) * 0x10000 +
	// 32-bit result, result bits 16-47, take bottom 16 as our top 16
	((aHigh * bLow) & 0xffff) * 0x10000;
	var productHigh =
	// 32-bit result, result bits 32-63, take all 32 bits
	(aHigh * bHigh) +
	// 32-bit result, result bits 16-47, take top 16 as our bottom 16
	((aLow * bHigh) >>> 16) +
	// 32-bit result, result bits 16-47, take top 16 as our bottom 16
	((aHigh * bLow) >>> 16);

	// Carry. Note that we actually have up to two carries due to addition of
	// three terms.
	while (productLow >= 0x100000000) {
	productLow -= 0x100000000;
	productHigh += 1;
	}

	return new jspb.arith.UInt64(productLow >>> 0, productHigh >>> 0);
	};


	/**
	* Multiply this number by a 32-bit number, producing a 96-bit number, then
	* truncate the top 32 bits.
	* @param {number} a The multiplier.
	* @return {!jspb.arith.UInt64}
	*/
	jspb.arith.UInt64.prototype.mul = function(a) {
	// Produce two parts: at bits 0-63, and 32-95.
	var lo = jspb.arith.UInt64.mul32x32(this.lo, a);
	var hi = jspb.arith.UInt64.mul32x32(this.hi, a);
	// Left-shift hi by 32 bits, truncating its top bits. The parts will then be
	// aligned for addition.
	hi.hi = hi.lo;
	hi.lo = 0;
	return lo.add(hi);
	};


	/**
	* Divide a 64-bit number by a 32-bit number to produce a
	* 64-bit quotient and a 32-bit remainder.
	* @param {number} _divisor
	* @return {Array.<jspb.arith.UInt64>} array of [quotient, remainder],
	* unless divisor is 0, in which case an empty array is returned.
	*/
	jspb.arith.UInt64.prototype.div = function(_divisor) {
	if (_divisor == 0) {
	return [];
	}

	// We perform long division using a radix-2 algorithm, for simplicity (i.e.,
	// one bit at a time). TODO: optimize to a radix-2^32 algorithm, taking care
	// to get the variable shifts right.
	var quotient = new jspb.arith.UInt64(0, 0);
	var remainder = new jspb.arith.UInt64(this.lo, this.hi);
	var divisor = new jspb.arith.UInt64(_divisor, 0);
	var unit = new jspb.arith.UInt64(1, 0);

	// Left-shift the divisor and unit until the high bit of divisor is set.
	while (!divisor.msb()) {
	divisor = divisor.leftShift();
	unit = unit.leftShift();
	}

	// Perform long division one bit at a time.
	while (!unit.zero()) {
	// If divisor < remainder, add unit to quotient and subtract divisor from
	// remainder.
	if (divisor.cmp(remainder) <= 0) {
	quotient = quotient.add(unit);
	remainder = remainder.sub(divisor);
	}
	// Right-shift the divisor and unit.
	divisor = divisor.rightShift();
	unit = unit.rightShift();
	}

	return [quotient, remainder];
	};


	/**
	* Convert a 64-bit number to a string.
	* @return {string}
	* @override
	*/
	jspb.arith.UInt64.prototype.toString = function() {
	var result = '';
	var num = this;
	while (!num.zero()) {
	var divResult = num.div(10);
	var quotient = divResult[0], remainder = divResult[1];
	result = remainder.lo + result;
	num = quotient;
	}
	if (result == '') {
	result = '0';
	}
	return result;
	};


	/**
	* Parse a string into a 64-bit number. Returns `null` on a parse error.
	* @param {string} s
	* @return {?jspb.arith.UInt64}
	*/
	jspb.arith.UInt64.fromString = function(s) {
	var result = new jspb.arith.UInt64(0, 0);
	// optimization: reuse this instance for each digit.
	var digit64 = new jspb.arith.UInt64(0, 0);
	for (var i = 0; i < s.length; i++) {
	if (s[i] < '0' \|\| s[i] > '9') {
	return null;
	}
	var digit = parseInt(s[i], 10);
	digit64.lo = digit;
	result = result.mul(10).add(digit64);
	}
	return result;
	};


	/**
	* Make a copy of the uint64.
	* @return {!jspb.arith.UInt64}
	*/
	jspb.arith.UInt64.prototype.clone = function() {
	return new jspb.arith.UInt64(this.lo, this.hi);
	};


	/**
	* Int64 is like UInt64, but modifies string conversions to interpret the stored
	* 64-bit value as a twos-complement-signed integer. It does not support the
	* full range of operations that UInt64 does: only add, subtract, and string
	* conversions.
	*
	* N.B. that multiply and divide routines are NOT supported. They will throw
	* exceptions. (They are not necessary to implement string conversions, which
	* are the only operations we really need in jspb.)
	*
	* @param {number} lo The low 32 bits.
	* @param {number} hi The high 32 bits.
	* @constructor
	*/
	jspb.arith.Int64 = function(lo, hi) {
	/**
	* The low 32 bits.
	* @public {number}
	*/
	this.lo = lo;
	/**
	* The high 32 bits.
	* @public {number}
	*/
	this.hi = hi;
	};


	/**
	* Add two 64-bit numbers to produce a 64-bit number.
	* @param {!jspb.arith.Int64} other
	* @return {!jspb.arith.Int64}
	*/
	jspb.arith.Int64.prototype.add = function(other) {
	var lo = ((this.lo + other.lo) & 0xffffffff) >>> 0;
	var hi =
	(((this.hi + other.hi) & 0xffffffff) >>> 0) +
	(((this.lo + other.lo) >= 0x100000000) ? 1 : 0);
	return new jspb.arith.Int64(lo >>> 0, hi >>> 0);
	};


	/**
	* Subtract two 64-bit numbers to produce a 64-bit number.
	* @param {!jspb.arith.Int64} other
	* @return {!jspb.arith.Int64}
	*/
	jspb.arith.Int64.prototype.sub = function(other) {
	var lo = ((this.lo - other.lo) & 0xffffffff) >>> 0;
	var hi =
	(((this.hi - other.hi) & 0xffffffff) >>> 0) -
	(((this.lo - other.lo) < 0) ? 1 : 0);
	return new jspb.arith.Int64(lo >>> 0, hi >>> 0);
	};


	/**
	* Make a copy of the int64.
	* @return {!jspb.arith.Int64}
	*/
	jspb.arith.Int64.prototype.clone = function() {
	return new jspb.arith.Int64(this.lo, this.hi);
	};


	/**
	* Convert a 64-bit number to a string.
	* @return {string}
	* @override
	*/
	jspb.arith.Int64.prototype.toString = function() {
	// If the number is negative, find its twos-complement inverse.
	var sign = (this.hi & 0x80000000) != 0;
	var num = new jspb.arith.UInt64(this.lo, this.hi);
	if (sign) {
	num = new jspb.arith.UInt64(0, 0).sub(num);
	}
	return (sign ? '-' : '') + num.toString();
	};


	/**
	* Parse a string into a 64-bit number. Returns `null` on a parse error.
	* @param {string} s
	* @return {?jspb.arith.Int64}
	*/
	jspb.arith.Int64.fromString = function(s) {
	var hasNegative = (s.length > 0 && s[0] == '-');
	if (hasNegative) {
	s = s.substring(1);
	}
	var num = jspb.arith.UInt64.fromString(s);
	if (num === null) {
	return null;
	}
	if (hasNegative) {
	num = new jspb.arith.UInt64(0, 0).sub(num);
	}
	return new jspb.arith.Int64(num.lo, num.hi);
	};