Javascript Bignum Extensions

Table of Contents

1 Introduction

The Bignum extensions add the following features to the Javascript language while being 100% backward compatible:

The extensions are independent from each other except the math mode which relies on BigFloat and operator overloading.

2 Operator overloading

Operator overloading is inspired from the proposal available at https://github.com/tc39/proposal-operator-overloading/. It implements the same dispatch logic but finds the operator sets by looking at the Symbol.operatorSet property in the objects. The changes were done in order to simplify the implementation.

More precisely, the following modifications were made:

3 BigInt extensions

A few properties are added to the BigInt object:

tdiv(a, b)

Return trunc(a/b). b = 0 raises a RangeError exception.

fdiv(a, b)

Return \lfloor a/b \rfloor. b = 0 raises a RangeError exception.

cdiv(a, b)

Return \lceil a/b \rceil. b = 0 raises a RangeError exception.

ediv(a, b)

Return sgn(b) \lfloor a/{|b|} \rfloor (Euclidian division). b = 0 raises a RangeError exception.

tdivrem(a, b)
fdivrem(a, b)
cdivrem(a, b)
edivrem(a, b)

Return an array of two elements. The first element is the quotient, the second is the remainder. The same rounding is done as the corresponding division operation.

sqrt(a)

Return \lfloor \sqrt(a) \rfloor. A RangeError exception is raised if a < 0.

sqrtrem(a)

Return an array of two elements. The first element is \lfloor \sqrt{a} \rfloor. The second element is a-\lfloor \sqrt{a} \rfloor^2. A RangeError exception is raised if a < 0.

floorLog2(a)

Return -1 if a \leq 0 otherwise return \lfloor \log2(a) \rfloor.

ctz(a)

Return the number of trailing zeros in the two’s complement binary representation of a. Return -1 if a=0.

4 BigFloat

4.1 Introduction

This extension adds the BigFloat primitive type. The BigFloat type represents floating point numbers are in base 2 with the IEEE 754 semantics. A floating point number is represented as a sign, mantissa and exponent. The special values NaN, +/-Infinity, +0 and -0 are supported. The mantissa and exponent can have any bit length with an implementation specific minimum and maximum.

4.2 Floating point rounding

Each floating point operation operates with infinite precision and then rounds the result according to the specified floating point environment (BigFloatEnv object). The status flags of the environment are also set according to the result of the operation.

If no floating point environment is provided, the global floating point environment is used.

The rounding mode of the global floating point environment is always RNDN (“round to nearest with ties to even”)1. The status flags of the global environment cannot be read2. The precision of the global environment is BigFloatEnv.prec. The number of exponent bits of the global environment is BigFloatEnv.expBits. If BigFloatEnv.expBits is strictly smaller than the maximum allowed number of exponent bits (BigFloatEnv.expBitsMax), then the global environment subnormal flag is set to true. Otherwise it is set to false;

For example, prec = 53 and expBits = 11 give exactly the same precision as the IEEE 754 64 bit floating point. The default precision is prec = 113 and expBits = 15 (IEEE 754 128 bit floating point).

The global floating point environment can only be modified temporarily when calling a function (see BigFloatEnv.setPrec). Hence a function can change the global floating point environment for its callees but not for its caller.

4.3 Operators

The builtin operators are extended so that a BigFloat is returned if at least one operand is a BigFloat. The computations are always done with infinite precision and rounded according to the global floating point environment.

typeof applied on a BigFloat returns bigfloat.

BigFloat can be compared with all the other numeric types and the result follows the expected mathematical relations.

However, since BigFloat and Number are different types they are never equal when using the strict comparison operators (e.g. 0.0 === 0.0l is false).

4.4 BigFloat literals

BigFloat literals are floating point numbers with a trailing l suffix. BigFloat literals have an infinite precision. They are rounded according to the global floating point environment when they are evaluated.3

4.5 Builtin Object changes

4.5.1 BigFloat function

The BigFloat function cannot be invoked as a constructor. When invoked as a function: the parameter is converted to a primitive type. If the result is a numeric type, it is converted to BigFloat without rounding. If the result is a string, it is converted to BigFloat using the precision of the global floating point environment.

BigFloat properties:

LN2
PI

Getter. Return the value of the corresponding mathematical constant rounded to nearest, ties to even with the current global precision. The constant values are cached for small precisions.

MIN_VALUE
MAX_VALUE
EPSILON

Getter. Return the minimum, maximum and epsilon BigFloat values (same definition as the corresponding Number constants).

fpRound(a[, e])

Round the floating point number a according to the floating point environment e or the global environment if e is undefined.

parseFloat(a[, radix[, e]])

Parse the string a as a floating point number in radix radix. The radix is 0 (default) or from 2 to 36. The radix 0 means radix 10 unless there is a hexadecimal or binary prefix. The result is rounded according to the floating point environment e or the global environment if e is undefined.

isFinite(a)

Return true if a is a finite bigfloat.

isNaN(a)

Return true if a is a NaN bigfloat.

add(a, b[, e])
sub(a, b[, e])
mul(a, b[, e])
div(a, b[, e])

Perform the specified floating point operation and round the floating point number a according to the floating point environment e or the global environment if e is undefined. If e is specified, the floating point status flags are updated.

floor(x)
ceil(x)
round(x)
trunc(x)

Round to an integer. No additional rounding is performed.

abs(x)

Return the absolute value of x. No additional rounding is performed.

fmod(x, y[, e])
remainder(x, y[, e])

Floating point remainder. The quotient is truncated to zero (fmod) or to the nearest integer with ties to even (remainder). e is an optional floating point environment.

sqrt(x[, e])

Square root. Return a rounded floating point number. e is an optional floating point environment.

sin(x[, e])
cos(x[, e])
tan(x[, e])
asin(x[, e])
acos(x[, e])
atan(x[, e])
atan2(x, y[, e])
exp(x[, e])
log(x[, e])
pow(x, y[, e])

Transcendental operations. Return a rounded floating point number. e is an optional floating point environment.

4.5.2 BigFloat.prototype

The following properties are modified:

valueOf()

Return the bigfloat primitive value corresponding to this.

toString(radix)

For floating point numbers:

The exponent letter is e for base 10, p for bases 2, 8, 16 with a binary exponent and @ for the other bases.

toPrecision(p, rnd_mode = BigFloatEnv.RNDNA, radix = 10)
toFixed(p, rnd_mode = BigFloatEnv.RNDNA, radix = 10)
toExponential(p, rnd_mode = BigFloatEnv.RNDNA, radix = 10)

Same semantics as the corresponding Number functions with BigFloats. There is no limit on the accepted precision p. The rounding mode and radix can be optionally specified. The radix must be between 2 and 36.

4.5.3 BigFloatEnv constructor

The BigFloatEnv([p, [,rndMode]] constructor cannot be invoked as a function. The floating point environment contains:

new BigFloatEnv([p, [,rndMode]] creates a new floating point environment. The status flags are reset. If no parameter is given the precision, exponent bits and subnormal flags are copied from the global floating point environment. Otherwise, the precision is set to p, the number of exponent bits is set to expBitsMax and the subnormal flags is set to false. If rndMode is undefined, the rounding mode is set to RNDN.

BigFloatEnv properties:

prec

Getter. Return the precision in bits of the global floating point environment. The initial value is 113.

expBits

Getter. Return the exponent size in bits of the global floating point environment assuming an IEEE 754 representation. If expBits < expBitsMax, then subnormal numbers are supported. The initial value is 15.

setPrec(f, p[, e])

Set the precision of the global floating point environment to p and the exponent size to e then call the function f. Then the Float precision and exponent size are reset to their precious value and the return value of f is returned (or an exception is raised if f raised an exception). If e is undefined it is set to BigFloatEnv.expBitsMax.

precMin

Read-only integer. Return the minimum allowed precision. Must be at least 2.

precMax

Read-only integer. Return the maximum allowed precision. Must be at least 113.

expBitsMin

Read-only integer. Return the minimum allowed exponent size in bits. Must be at least 3.

expBitsMax

Read-only integer. Return the maximum allowed exponent size in bits. Must be at least 15.

RNDN

Read-only integer. Round to nearest, with ties to even rounding mode.

RNDZ

Read-only integer. Round to zero rounding mode.

RNDD

Read-only integer. Round to -Infinity rounding mode.

RNDU

Read-only integer. Round to +Infinity rounding mode.

RNDNA

Read-only integer. Round to nearest, with ties away from zero rounding mode.

RNDA

Read-only integer. Round away from zero rounding mode.

RNDF4

Read-only integer. Faithful rounding mode. The result is non-deterministically rounded to -Infinity or +Infinity. This rounding mode usually gives a faster and deterministic running time for the floating point operations.

BigFloatEnv.prototype properties:

prec

Getter and setter (Integer). Return or set the precision in bits.

expBits

Getter and setter (Integer). Return or set the exponent size in bits assuming an IEEE 754 representation.

rndMode

Getter and setter (Integer). Return or set the rounding mode.

subnormal

Getter and setter (Boolean). subnormal flag. It is false when expBits = expBitsMax.

clearStatus()

Clear the status flags.

invalidOperation
divideByZero
overflow
underflow
inexact

Getter and setter (Boolean). Status flags.

5 BigDecimal

This extension adds the BigDecimal primitive type. The BigDecimal type represents floating point numbers in base 10. It is inspired from the proposal available at https://github.com/littledan/proposal-bigdecimal.

The BigDecimal floating point numbers are always normalized and finite. There is no concept of -0, Infinity or NaN. By default, all the computations are done with infinite precision.

5.1 Operators

The following builtin operators support BigDecimal:

+
-
*

Both operands must be BigDecimal. The result is computed with infinite precision.

%

Both operands must be BigDecimal. The result is computed with infinite precision. A range error is throws in case of division by zero.

/

Both operands must be BigDecimal. A range error is throws in case of division by zero or if the result cannot be represented with infinite precision (use BigDecimal.div to specify the rounding).

**

Both operands must be BigDecimal. The exponent must be a positive integer. The result is computed with infinite precision.

===

When one of the operand is a BigDecimal, return true if both operands are a BigDecimal and if they are equal.

==
!=
<=
>=
<
>

Numerical comparison. When one of the operand is not a BigDecimal, it is converted to BigDecimal by using ToString(). Hence comparisons between Number and BigDecimal do not use the exact mathematical value of the Number value.

5.2 BigDecimal literals

BigDecimal literals are decimal floating point numbers with a trailing m suffix.

5.3 Builtin Object changes

5.3.1 The BigDecimal function.

It returns 0m if no parameter is provided. Otherwise the first parameter is converted to a bigdecimal by using ToString(). Hence Number value are not converted to their exact numerical value as BigDecimal.

5.3.2 Properties of the BigDecimal object

add(a, b[, e])
sub(a, b[, e])
mul(a, b[, e])
div(a, b[, e])
mod(a, b[, e])
sqrt(a, e)
round(a, e)

Perform the specified floating point operation and round the floating point result according to the rounding object e. If the rounding object is not present, the operation is executed with infinite precision.

For div, a RangeError exception is thrown in case of division by zero or if the result cannot be represented with infinite precision if no rounding object is present.

For sqrt, a range error is thrown if a is less than zero.

The rounding object must contain the following properties: roundingMode is a string specifying the rounding mode ("floor", "ceiling", "down", "up", "half-even", "half-up"). Either maximumSignificantDigits or maximumFractionDigits must be present to specify respectively the number of significant digits (must be >= 1) or the number of digits after the decimal point (must be >= 0).

5.3.3 Properties of the BigDecimal.prototype object

valueOf()

Return the bigdecimal primitive value corresponding to this.

toString()

Convert this to a string with infinite precision in base 10.

toPrecision(p, rnd_mode = "half-up")
toFixed(p, rnd_mode = "half-up")
toExponential(p, rnd_mode = "half-up")

Convert the BigDecimal this to string with the specified precision p. There is no limit on the accepted precision p. The rounding mode can be optionally specified. toPrecision outputs either in decimal fixed notation or in decimal exponential notation with a p digits of precision. toExponential outputs in decimal exponential notation with p digits after the decimal point. toFixed outputs in decimal notation with p digits after the decimal point.

6 Math mode

A new math mode is enabled with the "use math" directive. It propagates the same way as the strict mode. It is designed so that arbitrarily large integers and floating point numbers are available by default. In order to minimize the number of changes in the Javascript semantics, integers are represented either as Number or BigInt depending on their magnitude. Floating point numbers are always represented as BigFloat.

The following changes are made to the Javascript semantics:


Footnotes

(1)

The rationale is that the rounding mode changes must always be explicit.

(2)

The rationale is to avoid side effects for the built-in operators.

(3)

Base 10 floating point literals cannot usually be exactly represented as base 2 floating point number. In order to ensure that the literal is represented accurately with the current precision, it must be evaluated at runtime.

(4)

Could be removed in case a deterministic behavior for floating point operations is required.