https://github.com/JuliaLang/julia
Tip revision: 70d19e90efcf811be980a0b9eedda6439756f0e6 authored by Jeff Bezanson on 17 July 2018, 05:35:02 UTC
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Tip revision: 70d19e9
math.jl
# This file is a part of Julia. License is MIT: https://julialang.org/license
module Math
export sin, cos, sincos, tan, sinh, cosh, tanh, asin, acos, atan,
asinh, acosh, atanh, sec, csc, cot, asec, acsc, acot,
sech, csch, coth, asech, acsch, acoth,
sinpi, cospi, sinc, cosc,
cosd, cotd, cscd, secd, sind, tand,
acosd, acotd, acscd, asecd, asind, atand,
rad2deg, deg2rad,
log, log2, log10, log1p, exponent, exp, exp2, exp10, expm1,
cbrt, sqrt, significand,
hypot, max, min, minmax, ldexp, frexp,
clamp, clamp!, modf, ^, mod2pi, rem2pi,
@evalpoly
import .Base: log, exp, sin, cos, tan, sinh, cosh, tanh, asin,
acos, atan, asinh, acosh, atanh, sqrt, log2, log10,
max, min, minmax, ^, exp2, muladd, rem,
exp10, expm1, log1p
using .Base: sign_mask, exponent_mask, exponent_one,
exponent_half, uinttype, significand_mask
using Core.Intrinsics: sqrt_llvm
using .Base: IEEEFloat
@noinline function throw_complex_domainerror(f, x)
throw(DomainError(x, string("$f will only return a complex result if called with a ",
"complex argument. Try $f(Complex(x)).")))
end
@noinline function throw_exp_domainerror(x)
throw(DomainError(x, string("Exponentiation yielding a complex result requires a ",
"complex argument.\nReplace x^y with (x+0im)^y, ",
"Complex(x)^y, or similar.")))
end
for T in (Float16, Float32, Float64)
@eval significand_bits(::Type{$T}) = $(trailing_ones(significand_mask(T)))
@eval exponent_bits(::Type{$T}) = $(sizeof(T)*8 - significand_bits(T) - 1)
@eval exponent_bias(::Type{$T}) = $(Int(exponent_one(T) >> significand_bits(T)))
# maximum float exponent
@eval exponent_max(::Type{$T}) = $(Int(exponent_mask(T) >> significand_bits(T)) - exponent_bias(T))
# maximum float exponent without bias
@eval exponent_raw_max(::Type{$T}) = $(Int(exponent_mask(T) >> significand_bits(T)))
end
# non-type specific math functions
"""
clamp(x, lo, hi)
Return `x` if `lo <= x <= hi`. If `x > hi`, return `hi`. If `x < lo`, return `lo`. Arguments
are promoted to a common type.
# Examples
```jldoctest
julia> clamp.([pi, 1.0, big(10.)], 2., 9.)
3-element Array{BigFloat,1}:
3.141592653589793238462643383279502884197169399375105820974944592307816406286198
2.0
9.0
julia> clamp.([11,8,5],10,6) # an example where lo > hi
3-element Array{Int64,1}:
6
6
10
```
"""
clamp(x::X, lo::L, hi::H) where {X,L,H} =
ifelse(x > hi, convert(promote_type(X,L,H), hi),
ifelse(x < lo,
convert(promote_type(X,L,H), lo),
convert(promote_type(X,L,H), x)))
"""
clamp!(array::AbstractArray, lo, hi)
Restrict values in `array` to the specified range, in-place.
See also [`clamp`](@ref).
"""
function clamp!(x::AbstractArray, lo, hi)
@inbounds for i in eachindex(x)
x[i] = clamp(x[i], lo, hi)
end
x
end
# evaluate p[1] + x * (p[2] + x * (....)), i.e. a polynomial via Horner's rule
macro horner(x, p...)
ex = esc(p[end])
for i = length(p)-1:-1:1
ex = :(muladd(t, $ex, $(esc(p[i]))))
end
Expr(:block, :(t = $(esc(x))), ex)
end
# Evaluate p[1] + z*p[2] + z^2*p[3] + ... + z^(n-1)*p[n]. This uses
# Horner's method if z is real, but for complex z it uses a more
# efficient algorithm described in Knuth, TAOCP vol. 2, section 4.6.4,
# equation (3).
"""
@evalpoly(z, c...)
Evaluate the polynomial ``\\sum_k c[k] z^{k-1}`` for the coefficients `c[1]`, `c[2]`, ...;
that is, the coefficients are given in ascending order by power of `z`. This macro expands
to efficient inline code that uses either Horner's method or, for complex `z`, a more
efficient Goertzel-like algorithm.
# Examples
```jldoctest
julia> @evalpoly(3, 1, 0, 1)
10
julia> @evalpoly(2, 1, 0, 1)
5
julia> @evalpoly(2, 1, 1, 1)
7
```
"""
macro evalpoly(z, p...)
a = :($(esc(p[end])))
b = :($(esc(p[end-1])))
as = []
for i = length(p)-2:-1:1
ai = Symbol("a", i)
push!(as, :($ai = $a))
a = :(muladd(r, $ai, $b))
b = :($(esc(p[i])) - s * $ai) # see issue #15985 on fused mul-subtract
end
ai = :a0
push!(as, :($ai = $a))
C = Expr(:block,
:(x = real(tt)),
:(y = imag(tt)),
:(r = x + x),
:(s = muladd(x, x, y*y)),
as...,
:(muladd($ai, tt, $b)))
R = Expr(:macrocall, Symbol("@horner"), (), :tt, map(esc, p)...)
:(let tt = $(esc(z))
isa(tt, Complex) ? $C : $R
end)
end
"""
rad2deg(x)
Convert `x` from radians to degrees.
# Examples
```jldoctest
julia> rad2deg(pi)
180.0
```
"""
rad2deg(z::AbstractFloat) = z * (180 / oftype(z, pi))
"""
deg2rad(x)
Convert `x` from degrees to radians.
# Examples
```jldoctest
julia> deg2rad(90)
1.5707963267948966
```
"""
deg2rad(z::AbstractFloat) = z * (oftype(z, pi) / 180)
rad2deg(z::Real) = rad2deg(float(z))
deg2rad(z::Real) = deg2rad(float(z))
rad2deg(z::Number) = (z/pi)*180
deg2rad(z::Number) = (z*pi)/180
log(b::T, x::T) where {T<:Number} = log(x)/log(b)
"""
log(b,x)
Compute the base `b` logarithm of `x`. Throws [`DomainError`](@ref) for negative
[`Real`](@ref) arguments.
# Examples
```jldoctest; filter = r"Stacktrace:(\\n \\[[0-9]+\\].*)*"
julia> log(4,8)
1.5
julia> log(4,2)
0.5
julia> log(-2, 3)
ERROR: DomainError with log:
-2.0 will only return a complex result if called with a complex argument. Try -2.0(Complex(x)).
Stacktrace:
[1] throw_complex_domainerror(::Float64, ::Symbol) at ./math.jl:31
[...]
julia> log(2, -3)
ERROR: DomainError with log:
-3.0 will only return a complex result if called with a complex argument. Try -3.0(Complex(x)).
Stacktrace:
[1] throw_complex_domainerror(::Float64, ::Symbol) at ./math.jl:31
[...]
```
!!! note
If `b` is a power of 2 or 10, [`log2`](@ref) or [`log10`](@ref) should be used, as these will
typically be faster and more accurate. For example,
```jldoctest
julia> log(100,1000000)
2.9999999999999996
julia> log10(1000000)/2
3.0
```
"""
log(b::Number, x::Number) = log(promote(b,x)...)
# type specific math functions
const libm = Base.libm_name
# functions with no domain error
"""
sinh(x)
Compute hyperbolic sine of `x`.
"""
sinh(x::Number)
"""
cosh(x)
Compute hyperbolic cosine of `x`.
"""
cosh(x::Number)
"""
tanh(x)
Compute hyperbolic tangent of `x`.
"""
tanh(x::Number)
"""
atan(y)
atan(y, x)
Compute the inverse tangent of `y` or `y/x`, respectively.
For one argument, this is the angle in radians between the positive *x*-axis and the point
(1, *y*), returning a value in the interval ``[-\\pi/2, \\pi/2]``.
For two arguments, this is the angle in radians between the positive *x*-axis and the
point (*x*, *y*), returning a value in the interval ``[-\\pi, \\pi]``. This corresponds to a
standard [`atan2`](https://en.wikipedia.org/wiki/Atan2) function.
"""
atan(x::Number)
"""
asinh(x)
Compute the inverse hyperbolic sine of `x`.
"""
asinh(x::Number)
"""
expm1(x)
Accurately compute ``e^x-1``.
"""
expm1(x)
for f in (:cbrt, :exp2, :expm1)
@eval begin
($f)(x::Float64) = ccall(($(string(f)),libm), Float64, (Float64,), x)
($f)(x::Float32) = ccall(($(string(f,"f")),libm), Float32, (Float32,), x)
($f)(x::Real) = ($f)(float(x))
end
end
# fallback definitions to prevent infinite loop from $f(x::Real) def above
"""
cbrt(x::Real)
Return the cube root of `x`, i.e. ``x^{1/3}``. Negative values are accepted
(returning the negative real root when ``x < 0``).
The prefix operator `∛` is equivalent to `cbrt`.
# Examples
```jldoctest
julia> cbrt(big(27))
3.0
julia> cbrt(big(-27))
-3.0
```
"""
cbrt(x::AbstractFloat) = x < 0 ? -(-x)^(1//3) : x^(1//3)
"""
exp2(x)
Compute the base 2 exponential of `x`, in other words ``2^x``.
# Examples
```jldoctest
julia> exp2(5)
32.0
```
"""
exp2(x::AbstractFloat) = 2^x
"""
exp10(x)
Compute the base 10 exponential of `x`, in other words ``10^x``.
# Examples
```jldoctest
julia> exp10(2)
100.0
```
"""
exp10(x::AbstractFloat) = 10^x
for f in (:sinh, :cosh, :tanh, :atan, :asinh, :exp, :expm1)
@eval ($f)(x::AbstractFloat) = error("not implemented for ", typeof(x))
end
# functions with special cases for integer arguments
@inline function exp2(x::Base.BitInteger)
if x > 1023
Inf64
elseif x <= -1023
# if -1073 < x <= -1023 then Result will be a subnormal number
# Hex literal with padding must be used to work on 32bit machine
reinterpret(Float64, 0x0000_0000_0000_0001 << ((x + 1074)) % UInt)
else
# We will cast everything to Int64 to avoid errors in case of Int128
# If x is a Int128, and is outside the range of Int64, then it is not -1023<x<=1023
reinterpret(Float64, (exponent_bias(Float64) + (x % Int64)) << (significand_bits(Float64)) % UInt)
end
end
# utility for converting NaN return to DomainError
# the branch in nan_dom_err prevents its callers from inlining, so be sure to force it
# until the heuristics can be improved
@inline nan_dom_err(out, x) = isnan(out) & !isnan(x) ? throw(DomainError(x, "NaN result for non-NaN input.")) : out
# functions that return NaN on non-NaN argument for domain error
"""
sin(x)
Compute sine of `x`, where `x` is in radians.
"""
sin(x::Number)
"""
cos(x)
Compute cosine of `x`, where `x` is in radians.
"""
cos(x::Number)
"""
tan(x)
Compute tangent of `x`, where `x` is in radians.
"""
tan(x::Number)
"""
asin(x)
Compute the inverse sine of `x`, where the output is in radians.
"""
asin(x::Number)
"""
acos(x)
Compute the inverse cosine of `x`, where the output is in radians
"""
acos(x::Number)
"""
acosh(x)
Compute the inverse hyperbolic cosine of `x`.
"""
acosh(x::Number)
"""
atanh(x)
Compute the inverse hyperbolic tangent of `x`.
"""
atanh(x::Number)
"""
log(x)
Compute the natural logarithm of `x`. Throws [`DomainError`](@ref) for negative
[`Real`](@ref) arguments. Use complex negative arguments to obtain complex results.
"""
log(x::Number)
"""
log2(x)
Compute the logarithm of `x` to base 2. Throws [`DomainError`](@ref) for negative
[`Real`](@ref) arguments.
# Examples
```jldoctest; filter = r"Stacktrace:(\\n \\[[0-9]+\\].*)*"
julia> log2(4)
2.0
julia> log2(10)
3.321928094887362
julia> log2(-2)
ERROR: DomainError with -2.0:
NaN result for non-NaN input.
Stacktrace:
[1] nan_dom_err at ./math.jl:325 [inlined]
[...]
```
"""
log2(x)
"""
log10(x)
Compute the logarithm of `x` to base 10.
Throws [`DomainError`](@ref) for negative [`Real`](@ref) arguments.
# Examples
```jldoctest; filter = r"Stacktrace:(\\n \\[[0-9]+\\].*)*"
julia> log10(100)
2.0
julia> log10(2)
0.3010299956639812
julia> log10(-2)
ERROR: DomainError with -2.0:
NaN result for non-NaN input.
Stacktrace:
[1] nan_dom_err at ./math.jl:325 [inlined]
[...]
```
"""
log10(x)
"""
log1p(x)
Accurate natural logarithm of `1+x`. Throws [`DomainError`](@ref) for [`Real`](@ref)
arguments less than -1.
# Examples
```jldoctest; filter = r"Stacktrace:(\\n \\[[0-9]+\\].*)*"
julia> log1p(-0.5)
-0.6931471805599453
julia> log1p(0)
0.0
julia> log1p(-2)
ERROR: DomainError with log1p:
-2.0 will only return a complex result if called with a complex argument. Try -2.0(Complex(x)).
Stacktrace:
[1] throw_complex_domainerror(::Float64, ::Symbol) at ./math.jl:31
[...]
```
"""
log1p(x)
for f in (:log2, :log10)
@eval begin
@inline ($f)(x::Float64) = nan_dom_err(ccall(($(string(f)), libm), Float64, (Float64,), x), x)
@inline ($f)(x::Float32) = nan_dom_err(ccall(($(string(f, "f")), libm), Float32, (Float32,), x), x)
@inline ($f)(x::Real) = ($f)(float(x))
end
end
@inline function sqrt(x::Union{Float32,Float64})
x < zero(x) && throw_complex_domainerror(:sqrt, x)
sqrt_llvm(x)
end
"""
sqrt(x)
Return ``\\sqrt{x}``. Throws [`DomainError`](@ref) for negative [`Real`](@ref) arguments.
Use complex negative arguments instead. The prefix operator `√` is equivalent to `sqrt`.
# Examples
```jldoctest; filter = r"Stacktrace:(\\n \\[[0-9]+\\].*)*"
julia> sqrt(big(81))
9.0
julia> sqrt(big(-81))
ERROR: DomainError with -8.1e+01:
NaN result for non-NaN input.
Stacktrace:
[1] sqrt(::BigFloat) at ./mpfr.jl:501
[...]
julia> sqrt(big(complex(-81)))
0.0 + 9.0im
```
"""
sqrt(x::Real) = sqrt(float(x))
"""
hypot(x, y)
Compute the hypotenuse ``\\sqrt{x^2+y^2}`` avoiding overflow and underflow.
# Examples
```jldoctest; filter = r"Stacktrace:(\\n \\[[0-9]+\\].*)*"
julia> a = 10^10;
julia> hypot(a, a)
1.4142135623730951e10
julia> √(a^2 + a^2) # a^2 overflows
ERROR: DomainError with -2.914184810805068e18:
sqrt will only return a complex result if called with a complex argument. Try sqrt(Complex(x)).
Stacktrace:
[...]
```
"""
hypot(x::Number, y::Number) = hypot(promote(x, y)...)
function hypot(x::T, y::T) where T<:Number
ax = abs(x)
ay = abs(y)
if ax < ay
ax, ay = ay, ax
end
if iszero(ax)
r = ay / oneunit(ax)
else
r = ay / ax
end
rr = ax * sqrt(1 + r * r)
# Use type of rr to make sure that return type is the same for
# all branches
if isnan(r)
isinf(ax) && return oftype(rr, Inf)
isinf(ay) && return oftype(rr, Inf)
return oftype(rr, r)
else
return rr
end
end
"""
hypot(x...)
Compute the hypotenuse ``\\sqrt{\\sum x_i^2}`` avoiding overflow and underflow.
"""
hypot(x::Number...) = sqrt(sum(abs2(y) for y in x))
atan(y::Real, x::Real) = atan(promote(float(y),float(x))...)
atan(y::T, x::T) where {T<:AbstractFloat} = Base.no_op_err("atan", T)
max(x::T, y::T) where {T<:AbstractFloat} = ifelse((y > x) | (signbit(y) < signbit(x)),
ifelse(isnan(x), x, y), ifelse(isnan(y), y, x))
min(x::T, y::T) where {T<:AbstractFloat} = ifelse((y < x) | (signbit(y) > signbit(x)),
ifelse(isnan(x), x, y), ifelse(isnan(y), y, x))
minmax(x::T, y::T) where {T<:AbstractFloat} =
ifelse(isnan(x) | isnan(y), ifelse(isnan(x), (x,x), (y,y)),
ifelse((y > x) | (signbit(x) > signbit(y)), (x,y), (y,x)))
"""
ldexp(x, n)
Compute ``x \\times 2^n``.
# Examples
```jldoctest
julia> ldexp(5., 2)
20.0
```
"""
function ldexp(x::T, e::Integer) where T<:IEEEFloat
xu = reinterpret(Unsigned, x)
xs = xu & ~sign_mask(T)
xs >= exponent_mask(T) && return x # NaN or Inf
k = Int(xs >> significand_bits(T))
if k == 0 # x is subnormal
xs == 0 && return x # +-0
m = leading_zeros(xs) - exponent_bits(T)
ys = xs << unsigned(m)
xu = ys | (xu & sign_mask(T))
k = 1 - m
# underflow, otherwise may have integer underflow in the following n + k
e < -50000 && return flipsign(T(0.0), x)
end
# For cases where e of an Integer larger than Int make sure we properly
# overflow/underflow; this is optimized away otherwise.
if e > typemax(Int)
return flipsign(T(Inf), x)
elseif e < typemin(Int)
return flipsign(T(0.0), x)
end
n = e % Int
k += n
# overflow, if k is larger than maximum possible exponent
if k >= exponent_raw_max(T)
return flipsign(T(Inf), x)
end
if k > 0 # normal case
xu = (xu & ~exponent_mask(T)) | (rem(k, uinttype(T)) << significand_bits(T))
return reinterpret(T, xu)
else # subnormal case
if k <= -significand_bits(T) # underflow
# overflow, for the case of integer overflow in n + k
e > 50000 && return flipsign(T(Inf), x)
return flipsign(T(0.0), x)
end
k += significand_bits(T)
z = T(2.0)^-significand_bits(T)
xu = (xu & ~exponent_mask(T)) | (rem(k, uinttype(T)) << significand_bits(T))
return z*reinterpret(T, xu)
end
end
ldexp(x::Float16, q::Integer) = Float16(ldexp(Float32(x), q))
"""
exponent(x) -> Int
Get the exponent of a normalized floating-point number.
"""
function exponent(x::T) where T<:IEEEFloat
@noinline throw1(x) = throw(DomainError(x, "Cannot be NaN or Inf."))
@noinline throw2(x) = throw(DomainError(x, "Cannot be subnormal converted to 0."))
xs = reinterpret(Unsigned, x) & ~sign_mask(T)
xs >= exponent_mask(T) && throw1(x)
k = Int(xs >> significand_bits(T))
if k == 0 # x is subnormal
xs == 0 && throw2(x)
m = leading_zeros(xs) - exponent_bits(T)
k = 1 - m
end
return k - exponent_bias(T)
end
"""
significand(x)
Extract the `significand(s)` (a.k.a. mantissa), in binary representation, of a
floating-point number. If `x` is a non-zero finite number, then the result will be
a number of the same type on the interval ``[1,2)``. Otherwise `x` is returned.
# Examples
```jldoctest
julia> significand(15.2)/15.2
0.125
julia> significand(15.2)*8
15.2
```
"""
function significand(x::T) where T<:IEEEFloat
xu = reinterpret(Unsigned, x)
xs = xu & ~sign_mask(T)
xs >= exponent_mask(T) && return x # NaN or Inf
if xs <= (~exponent_mask(T) & ~sign_mask(T)) # x is subnormal
xs == 0 && return x # +-0
m = unsigned(leading_zeros(xs) - exponent_bits(T))
xs <<= m
xu = xs | (xu & sign_mask(T))
end
xu = (xu & ~exponent_mask(T)) | exponent_one(T)
return reinterpret(T, xu)
end
"""
frexp(val)
Return `(x,exp)` such that `x` has a magnitude in the interval ``[1/2, 1)`` or 0,
and `val` is equal to ``x \\times 2^{exp}``.
"""
function frexp(x::T) where T<:IEEEFloat
xu = reinterpret(Unsigned, x)
xs = xu & ~sign_mask(T)
xs >= exponent_mask(T) && return x, 0 # NaN or Inf
k = Int(xs >> significand_bits(T))
if k == 0 # x is subnormal
xs == 0 && return x, 0 # +-0
m = leading_zeros(xs) - exponent_bits(T)
xs <<= unsigned(m)
xu = xs | (xu & sign_mask(T))
k = 1 - m
end
k -= (exponent_bias(T) - 1)
xu = (xu & ~exponent_mask(T)) | exponent_half(T)
return reinterpret(T, xu), k
end
"""
rem(x, y, r::RoundingMode)
Compute the remainder of `x` after integer division by `y`, with the quotient rounded
according to the rounding mode `r`. In other words, the quantity
x - y*round(x/y,r)
without any intermediate rounding.
- if `r == RoundNearest`, then the result is exact, and in the interval
``[-|y|/2, |y|/2]``.
- if `r == RoundToZero` (default), then the result is exact, and in the interval
``[0, |y|)`` if `x` is positive, or ``(-|y|, 0]`` otherwise.
- if `r == RoundDown`, then the result is in the interval ``[0, y)`` if `y` is positive, or
``(y, 0]`` otherwise. The result may not be exact if `x` and `y` have different signs, and
`abs(x) < abs(y)`.
- if `r == RoundUp`, then the result is in the interval `(-y,0]` if `y` is positive, or
`[0,-y)` otherwise. The result may not be exact if `x` and `y` have the same sign, and
`abs(x) < abs(y)`.
"""
rem(x, y, ::RoundingMode{:ToZero}) = rem(x,y)
rem(x, y, ::RoundingMode{:Down}) = mod(x,y)
rem(x, y, ::RoundingMode{:Up}) = mod(x,-y)
rem(x::Float64, y::Float64, ::RoundingMode{:Nearest}) =
ccall((:remainder, libm),Float64,(Float64,Float64),x,y)
rem(x::Float32, y::Float32, ::RoundingMode{:Nearest}) =
ccall((:remainderf, libm),Float32,(Float32,Float32),x,y)
rem(x::Float16, y::Float16, r::RoundingMode{:Nearest}) = Float16(rem(Float32(x), Float32(y), r))
"""
modf(x)
Return a tuple `(fpart, ipart)` of the fractional and integral parts of a number. Both parts
have the same sign as the argument.
# Examples
```jldoctest
julia> modf(3.5)
(0.5, 3.0)
julia> modf(-3.5)
(-0.5, -3.0)
```
"""
modf(x) = rem(x,one(x)), trunc(x)
function modf(x::Float32)
temp = Ref{Float32}()
f = ccall((:modff, libm), Float32, (Float32, Ptr{Float32}), x, temp)
f, temp[]
end
function modf(x::Float64)
temp = Ref{Float64}()
f = ccall((:modf, libm), Float64, (Float64, Ptr{Float64}), x, temp)
f, temp[]
end
@inline function ^(x::Float64, y::Float64)
z = ccall("llvm.pow.f64", llvmcall, Float64, (Float64, Float64), x, y)
if isnan(z) & !isnan(x+y)
throw_exp_domainerror(x)
end
z
end
@inline function ^(x::Float32, y::Float32)
z = ccall("llvm.pow.f32", llvmcall, Float32, (Float32, Float32), x, y)
if isnan(z) & !isnan(x+y)
throw_exp_domainerror(x)
end
z
end
@inline ^(x::Float64, y::Integer) = ccall("llvm.pow.f64", llvmcall, Float64, (Float64, Float64), x, Float64(y))
@inline ^(x::Float32, y::Integer) = ccall("llvm.pow.f32", llvmcall, Float32, (Float32, Float32), x, Float32(y))
@inline ^(x::Float16, y::Integer) = Float16(Float32(x) ^ y)
@inline literal_pow(::typeof(^), x::Float16, ::Val{p}) where {p} = Float16(literal_pow(^,Float32(x),Val(p)))
## rem2pi-related calculations ##
function add22condh(xh::Float64, xl::Float64, yh::Float64, yl::Float64)
# This algorithm, due to Dekker, computes the sum of two
# double-double numbers and returns the high double. References:
# [1] http://www.digizeitschriften.de/en/dms/img/?PID=GDZPPN001170007
# [2] https://doi.org/10.1007/BF01397083
r = xh+yh
s = (abs(xh) > abs(yh)) ? (xh-r+yh+yl+xl) : (yh-r+xh+xl+yl)
zh = r+s
return zh
end
# multiples of pi/2, as double-double (ie with "tail")
const pi1o2_h = 1.5707963267948966 # convert(Float64, pi * BigFloat(1/2))
const pi1o2_l = 6.123233995736766e-17 # convert(Float64, pi * BigFloat(1/2) - pi1o2_h)
const pi2o2_h = 3.141592653589793 # convert(Float64, pi * BigFloat(1))
const pi2o2_l = 1.2246467991473532e-16 # convert(Float64, pi * BigFloat(1) - pi2o2_h)
const pi3o2_h = 4.71238898038469 # convert(Float64, pi * BigFloat(3/2))
const pi3o2_l = 1.8369701987210297e-16 # convert(Float64, pi * BigFloat(3/2) - pi3o2_h)
const pi4o2_h = 6.283185307179586 # convert(Float64, pi * BigFloat(2))
const pi4o2_l = 2.4492935982947064e-16 # convert(Float64, pi * BigFloat(2) - pi4o2_h)
"""
rem2pi(x, r::RoundingMode)
Compute the remainder of `x` after integer division by `2π`, with the quotient rounded
according to the rounding mode `r`. In other words, the quantity
x - 2π*round(x/(2π),r)
without any intermediate rounding. This internally uses a high precision approximation of
2π, and so will give a more accurate result than `rem(x,2π,r)`
- if `r == RoundNearest`, then the result is in the interval ``[-π, π]``. This will generally
be the most accurate result.
- if `r == RoundToZero`, then the result is in the interval ``[0, 2π]`` if `x` is positive,.
or ``[-2π, 0]`` otherwise.
- if `r == RoundDown`, then the result is in the interval ``[0, 2π]``.
- if `r == RoundUp`, then the result is in the interval ``[-2π, 0]``.
# Examples
```jldoctest
julia> rem2pi(7pi/4, RoundNearest)
-0.7853981633974485
julia> rem2pi(7pi/4, RoundDown)
5.497787143782138
```
"""
function rem2pi end
function rem2pi(x::Float64, ::RoundingMode{:Nearest})
abs(x) < pi && return x
n,y = rem_pio2_kernel(x)
if iseven(n)
if n & 2 == 2 # n % 4 == 2: add/subtract pi
if y.hi <= 0
return add22condh(y.hi,y.lo,pi2o2_h,pi2o2_l)
else
return add22condh(y.hi,y.lo,-pi2o2_h,-pi2o2_l)
end
else # n % 4 == 0: add 0
return y.hi+y.lo
end
else
if n & 2 == 2 # n % 4 == 3: subtract pi/2
return add22condh(y.hi,y.lo,-pi1o2_h,-pi1o2_l)
else # n % 4 == 1: add pi/2
return add22condh(y.hi,y.lo,pi1o2_h,pi1o2_l)
end
end
end
function rem2pi(x::Float64, ::RoundingMode{:ToZero})
ax = abs(x)
ax <= 2*Float64(pi,RoundDown) && return x
n,y = rem_pio2_kernel(x)
if iseven(n)
if n & 2 == 2 # n % 4 == 2: add pi
z = add22condh(y.hi,y.lo,pi2o2_h,pi2o2_l)
else # n % 4 == 0: add 0 or 2pi
if y.hi > 0
z = y.hi+y.lo
else # negative: add 2pi
z = add22condh(y.hi,y.lo,pi4o2_h,pi4o2_l)
end
end
else
if n & 2 == 2 # n % 4 == 3: add 3pi/2
z = add22condh(y.hi,y.lo,pi3o2_h,pi3o2_l)
else # n % 4 == 1: add pi/2
z = add22condh(y.hi,y.lo,pi1o2_h,pi1o2_l)
end
end
copysign(z,x)
end
function rem2pi(x::Float64, ::RoundingMode{:Down})
if x < pi4o2_h
if x >= 0
return x
elseif x > -pi4o2_h
return add22condh(x,0.0,pi4o2_h,pi4o2_l)
end
end
n,y = rem_pio2_kernel(x)
if iseven(n)
if n & 2 == 2 # n % 4 == 2: add pi
return add22condh(y.hi,y.lo,pi2o2_h,pi2o2_l)
else # n % 4 == 0: add 0 or 2pi
if y.hi > 0
return y.hi+y.lo
else # negative: add 2pi
return add22condh(y.hi,y.lo,pi4o2_h,pi4o2_l)
end
end
else
if n & 2 == 2 # n % 4 == 3: add 3pi/2
return add22condh(y.hi,y.lo,pi3o2_h,pi3o2_l)
else # n % 4 == 1: add pi/2
return add22condh(y.hi,y.lo,pi1o2_h,pi1o2_l)
end
end
end
function rem2pi(x::Float64, ::RoundingMode{:Up})
if x > -pi4o2_h
if x <= 0
return x
elseif x < pi4o2_h
return add22condh(x,0.0,-pi4o2_h,-pi4o2_l)
end
end
n,y = rem_pio2_kernel(x)
if iseven(n)
if n & 2 == 2 # n % 4 == 2: sub pi
return add22condh(y.hi,y.lo,-pi2o2_h,-pi2o2_l)
else # n % 4 == 0: sub 0 or 2pi
if y.hi < 0
return y.hi+y.lo
else # positive: sub 2pi
return add22condh(y.hi,y.lo,-pi4o2_h,-pi4o2_l)
end
end
else
if n & 2 == 2 # n % 4 == 3: sub pi/2
return add22condh(y.hi,y.lo,-pi1o2_h,-pi1o2_l)
else # n % 4 == 1: sub 3pi/2
return add22condh(y.hi,y.lo,-pi3o2_h,-pi3o2_l)
end
end
end
rem2pi(x::Float32, r::RoundingMode) = Float32(rem2pi(Float64(x), r))
rem2pi(x::Float16, r::RoundingMode) = Float16(rem2pi(Float64(x), r))
rem2pi(x::Int32, r::RoundingMode) = rem2pi(Float64(x), r)
function rem2pi(x::Int64, r::RoundingMode)
fx = Float64(x)
fx == x || throw(ArgumentError("Int64 argument to rem2pi is too large: $x"))
rem2pi(fx, r)
end
"""
mod2pi(x)
Modulus after division by `2π`, returning in the range ``[0,2π)``.
This function computes a floating point representation of the modulus after division by
numerically exact `2π`, and is therefore not exactly the same as `mod(x,2π)`, which would
compute the modulus of `x` relative to division by the floating-point number `2π`.
# Examples
```jldoctest
julia> mod2pi(9*pi/4)
0.7853981633974481
```
"""
mod2pi(x) = rem2pi(x,RoundDown)
# generic fallback; for number types, promotion.jl does promotion
"""
muladd(x, y, z)
Combined multiply-add: computes `x*y+z`, but allowing the add and multiply to be merged
with each other or with surrounding operations for performance.
For example, this may be implemented as an [`fma`](@ref) if the hardware supports it
efficiently.
The result can be different on different machines and can also be different on the same machine
due to constant propagation or other optimizations.
See [`fma`](@ref).
# Examples
```jldoctest
julia> muladd(3, 2, 1)
7
julia> 3 * 2 + 1
7
```
"""
muladd(x,y,z) = x*y+z
# Float16 definitions
for func in (:sin,:cos,:tan,:asin,:acos,:atan,:sinh,:cosh,:tanh,:asinh,:acosh,
:atanh,:exp,:exp2,:exp10,:log,:log2,:log10,:sqrt,:lgamma,:log1p)
@eval begin
$func(a::Float16) = Float16($func(Float32(a)))
$func(a::ComplexF16) = ComplexF16($func(ComplexF32(a)))
end
end
for func in (:atan,:hypot)
@eval begin
$func(a::Float16,b::Float16) = Float16($func(Float32(a),Float32(b)))
end
end
cbrt(a::Float16) = Float16(cbrt(Float32(a)))
sincos(a::Float16) = Float16.(sincos(Float32(a)))
# More special functions
include("special/exp.jl")
include("special/exp10.jl")
include("special/hyperbolic.jl")
include("special/trig.jl")
include("special/rem_pio2.jl")
include("special/log.jl")
# `missing` definitions for functions in this module
for f in (:(acos), :(acosh), :(asin), :(asinh), :(atan), :(atanh),
:(sin), :(sinh), :(cos), :(cosh), :(tan), :(tanh),
:(exp), :(exp2), :(expm1), :(log), :(log10), :(log1p),
:(log2), :(exponent), :(sqrt))
@eval $(f)(::Missing) = missing
end
end # module