mirror of
https://github.com/42wim/matterbridge
synced 2024-11-17 03:26:07 +00:00
371 lines
9.7 KiB
Go
371 lines
9.7 KiB
Go
// Package bigfft implements multiplication of big.Int using FFT.
|
|
//
|
|
// The implementation is based on the Schönhage-Strassen method
|
|
// using integer FFT modulo 2^n+1.
|
|
package bigfft
|
|
|
|
import (
|
|
"math/big"
|
|
"unsafe"
|
|
)
|
|
|
|
const _W = int(unsafe.Sizeof(big.Word(0)) * 8)
|
|
|
|
type nat []big.Word
|
|
|
|
func (n nat) String() string {
|
|
v := new(big.Int)
|
|
v.SetBits(n)
|
|
return v.String()
|
|
}
|
|
|
|
// fftThreshold is the size (in words) above which FFT is used over
|
|
// Karatsuba from math/big.
|
|
//
|
|
// TestCalibrate seems to indicate a threshold of 60kbits on 32-bit
|
|
// arches and 110kbits on 64-bit arches.
|
|
var fftThreshold = 1800
|
|
|
|
// Mul computes the product x*y and returns z.
|
|
// It can be used instead of the Mul method of
|
|
// *big.Int from math/big package.
|
|
func Mul(x, y *big.Int) *big.Int {
|
|
xwords := len(x.Bits())
|
|
ywords := len(y.Bits())
|
|
if xwords > fftThreshold && ywords > fftThreshold {
|
|
return mulFFT(x, y)
|
|
}
|
|
return new(big.Int).Mul(x, y)
|
|
}
|
|
|
|
func mulFFT(x, y *big.Int) *big.Int {
|
|
var xb, yb nat = x.Bits(), y.Bits()
|
|
zb := fftmul(xb, yb)
|
|
z := new(big.Int)
|
|
z.SetBits(zb)
|
|
if x.Sign()*y.Sign() < 0 {
|
|
z.Neg(z)
|
|
}
|
|
return z
|
|
}
|
|
|
|
// A FFT size of K=1<<k is adequate when K is about 2*sqrt(N) where
|
|
// N = x.Bitlen() + y.Bitlen().
|
|
|
|
func fftmul(x, y nat) nat {
|
|
k, m := fftSize(x, y)
|
|
xp := polyFromNat(x, k, m)
|
|
yp := polyFromNat(y, k, m)
|
|
rp := xp.Mul(&yp)
|
|
return rp.Int()
|
|
}
|
|
|
|
// fftSizeThreshold[i] is the maximal size (in bits) where we should use
|
|
// fft size i.
|
|
var fftSizeThreshold = [...]int64{0, 0, 0,
|
|
4 << 10, 8 << 10, 16 << 10, // 5
|
|
32 << 10, 64 << 10, 1 << 18, 1 << 20, 3 << 20, // 10
|
|
8 << 20, 30 << 20, 100 << 20, 300 << 20, 600 << 20,
|
|
}
|
|
|
|
// returns the FFT length k, m the number of words per chunk
|
|
// such that m << k is larger than the number of words
|
|
// in x*y.
|
|
func fftSize(x, y nat) (k uint, m int) {
|
|
words := len(x) + len(y)
|
|
bits := int64(words) * int64(_W)
|
|
k = uint(len(fftSizeThreshold))
|
|
for i := range fftSizeThreshold {
|
|
if fftSizeThreshold[i] > bits {
|
|
k = uint(i)
|
|
break
|
|
}
|
|
}
|
|
// The 1<<k chunks of m words must have N bits so that
|
|
// 2^N-1 is larger than x*y. That is, m<<k > words
|
|
m = words>>k + 1
|
|
return
|
|
}
|
|
|
|
// valueSize returns the length (in words) to use for polynomial
|
|
// coefficients, to compute a correct product of polynomials P*Q
|
|
// where deg(P*Q) < K (== 1<<k) and where coefficients of P and Q are
|
|
// less than b^m (== 1 << (m*_W)).
|
|
// The chosen length (in bits) must be a multiple of 1 << (k-extra).
|
|
func valueSize(k uint, m int, extra uint) int {
|
|
// The coefficients of P*Q are less than b^(2m)*K
|
|
// so we need W * valueSize >= 2*m*W+K
|
|
n := 2*m*_W + int(k) // necessary bits
|
|
K := 1 << (k - extra)
|
|
if K < _W {
|
|
K = _W
|
|
}
|
|
n = ((n / K) + 1) * K // round to a multiple of K
|
|
return n / _W
|
|
}
|
|
|
|
// poly represents an integer via a polynomial in Z[x]/(x^K+1)
|
|
// where K is the FFT length and b^m is the computation basis 1<<(m*_W).
|
|
// If P = a[0] + a[1] x + ... a[n] x^(K-1), the associated natural number
|
|
// is P(b^m).
|
|
type poly struct {
|
|
k uint // k is such that K = 1<<k.
|
|
m int // the m such that P(b^m) is the original number.
|
|
a []nat // a slice of at most K m-word coefficients.
|
|
}
|
|
|
|
// polyFromNat slices the number x into a polynomial
|
|
// with 1<<k coefficients made of m words.
|
|
func polyFromNat(x nat, k uint, m int) poly {
|
|
p := poly{k: k, m: m}
|
|
length := len(x)/m + 1
|
|
p.a = make([]nat, length)
|
|
for i := range p.a {
|
|
if len(x) < m {
|
|
p.a[i] = make(nat, m)
|
|
copy(p.a[i], x)
|
|
break
|
|
}
|
|
p.a[i] = x[:m]
|
|
x = x[m:]
|
|
}
|
|
return p
|
|
}
|
|
|
|
// Int evaluates back a poly to its integer value.
|
|
func (p *poly) Int() nat {
|
|
length := len(p.a)*p.m + 1
|
|
if na := len(p.a); na > 0 {
|
|
length += len(p.a[na-1])
|
|
}
|
|
n := make(nat, length)
|
|
m := p.m
|
|
np := n
|
|
for i := range p.a {
|
|
l := len(p.a[i])
|
|
c := addVV(np[:l], np[:l], p.a[i])
|
|
if np[l] < ^big.Word(0) {
|
|
np[l] += c
|
|
} else {
|
|
addVW(np[l:], np[l:], c)
|
|
}
|
|
np = np[m:]
|
|
}
|
|
n = trim(n)
|
|
return n
|
|
}
|
|
|
|
func trim(n nat) nat {
|
|
for i := range n {
|
|
if n[len(n)-1-i] != 0 {
|
|
return n[:len(n)-i]
|
|
}
|
|
}
|
|
return nil
|
|
}
|
|
|
|
// Mul multiplies p and q modulo X^K-1, where K = 1<<p.k.
|
|
// The product is done via a Fourier transform.
|
|
func (p *poly) Mul(q *poly) poly {
|
|
// extra=2 because:
|
|
// * some power of 2 is a K-th root of unity when n is a multiple of K/2.
|
|
// * 2 itself is a square (see fermat.ShiftHalf)
|
|
n := valueSize(p.k, p.m, 2)
|
|
|
|
pv, qv := p.Transform(n), q.Transform(n)
|
|
rv := pv.Mul(&qv)
|
|
r := rv.InvTransform()
|
|
r.m = p.m
|
|
return r
|
|
}
|
|
|
|
// A polValues represents the value of a poly at the powers of a
|
|
// K-th root of unity θ=2^(l/2) in Z/(b^n+1)Z, where b^n = 2^(K/4*l).
|
|
type polValues struct {
|
|
k uint // k is such that K = 1<<k.
|
|
n int // the length of coefficients, n*_W a multiple of K/4.
|
|
values []fermat // a slice of K (n+1)-word values
|
|
}
|
|
|
|
// Transform evaluates p at θ^i for i = 0...K-1, where
|
|
// θ is a K-th primitive root of unity in Z/(b^n+1)Z.
|
|
func (p *poly) Transform(n int) polValues {
|
|
k := p.k
|
|
inputbits := make([]big.Word, (n+1)<<k)
|
|
input := make([]fermat, 1<<k)
|
|
// Now computed q(ω^i) for i = 0 ... K-1
|
|
valbits := make([]big.Word, (n+1)<<k)
|
|
values := make([]fermat, 1<<k)
|
|
for i := range values {
|
|
input[i] = inputbits[i*(n+1) : (i+1)*(n+1)]
|
|
if i < len(p.a) {
|
|
copy(input[i], p.a[i])
|
|
}
|
|
values[i] = fermat(valbits[i*(n+1) : (i+1)*(n+1)])
|
|
}
|
|
fourier(values, input, false, n, k)
|
|
return polValues{k, n, values}
|
|
}
|
|
|
|
// InvTransform reconstructs p (modulo X^K - 1) from its
|
|
// values at θ^i for i = 0..K-1.
|
|
func (v *polValues) InvTransform() poly {
|
|
k, n := v.k, v.n
|
|
|
|
// Perform an inverse Fourier transform to recover p.
|
|
pbits := make([]big.Word, (n+1)<<k)
|
|
p := make([]fermat, 1<<k)
|
|
for i := range p {
|
|
p[i] = fermat(pbits[i*(n+1) : (i+1)*(n+1)])
|
|
}
|
|
fourier(p, v.values, true, n, k)
|
|
// Divide by K, and untwist q to recover p.
|
|
u := make(fermat, n+1)
|
|
a := make([]nat, 1<<k)
|
|
for i := range p {
|
|
u.Shift(p[i], -int(k))
|
|
copy(p[i], u)
|
|
a[i] = nat(p[i])
|
|
}
|
|
return poly{k: k, m: 0, a: a}
|
|
}
|
|
|
|
// NTransform evaluates p at θω^i for i = 0...K-1, where
|
|
// θ is a (2K)-th primitive root of unity in Z/(b^n+1)Z
|
|
// and ω = θ².
|
|
func (p *poly) NTransform(n int) polValues {
|
|
k := p.k
|
|
if len(p.a) >= 1<<k {
|
|
panic("Transform: len(p.a) >= 1<<k")
|
|
}
|
|
// θ is represented as a shift.
|
|
θshift := (n * _W) >> k
|
|
// p(x) = a_0 + a_1 x + ... + a_{K-1} x^(K-1)
|
|
// p(θx) = q(x) where
|
|
// q(x) = a_0 + θa_1 x + ... + θ^(K-1) a_{K-1} x^(K-1)
|
|
//
|
|
// Twist p by θ to obtain q.
|
|
tbits := make([]big.Word, (n+1)<<k)
|
|
twisted := make([]fermat, 1<<k)
|
|
src := make(fermat, n+1)
|
|
for i := range twisted {
|
|
twisted[i] = fermat(tbits[i*(n+1) : (i+1)*(n+1)])
|
|
if i < len(p.a) {
|
|
for i := range src {
|
|
src[i] = 0
|
|
}
|
|
copy(src, p.a[i])
|
|
twisted[i].Shift(src, θshift*i)
|
|
}
|
|
}
|
|
|
|
// Now computed q(ω^i) for i = 0 ... K-1
|
|
valbits := make([]big.Word, (n+1)<<k)
|
|
values := make([]fermat, 1<<k)
|
|
for i := range values {
|
|
values[i] = fermat(valbits[i*(n+1) : (i+1)*(n+1)])
|
|
}
|
|
fourier(values, twisted, false, n, k)
|
|
return polValues{k, n, values}
|
|
}
|
|
|
|
// InvTransform reconstructs a polynomial from its values at
|
|
// roots of x^K+1. The m field of the returned polynomial
|
|
// is unspecified.
|
|
func (v *polValues) InvNTransform() poly {
|
|
k := v.k
|
|
n := v.n
|
|
θshift := (n * _W) >> k
|
|
|
|
// Perform an inverse Fourier transform to recover q.
|
|
qbits := make([]big.Word, (n+1)<<k)
|
|
q := make([]fermat, 1<<k)
|
|
for i := range q {
|
|
q[i] = fermat(qbits[i*(n+1) : (i+1)*(n+1)])
|
|
}
|
|
fourier(q, v.values, true, n, k)
|
|
|
|
// Divide by K, and untwist q to recover p.
|
|
u := make(fermat, n+1)
|
|
a := make([]nat, 1<<k)
|
|
for i := range q {
|
|
u.Shift(q[i], -int(k)-i*θshift)
|
|
copy(q[i], u)
|
|
a[i] = nat(q[i])
|
|
}
|
|
return poly{k: k, m: 0, a: a}
|
|
}
|
|
|
|
// fourier performs an unnormalized Fourier transform
|
|
// of src, a length 1<<k vector of numbers modulo b^n+1
|
|
// where b = 1<<_W.
|
|
func fourier(dst []fermat, src []fermat, backward bool, n int, k uint) {
|
|
var rec func(dst, src []fermat, size uint)
|
|
tmp := make(fermat, n+1) // pre-allocate temporary variables.
|
|
tmp2 := make(fermat, n+1) // pre-allocate temporary variables.
|
|
|
|
// The recursion function of the FFT.
|
|
// The root of unity used in the transform is ω=1<<(ω2shift/2).
|
|
// The source array may use shifted indices (i.e. the i-th
|
|
// element is src[i << idxShift]).
|
|
rec = func(dst, src []fermat, size uint) {
|
|
idxShift := k - size
|
|
ω2shift := (4 * n * _W) >> size
|
|
if backward {
|
|
ω2shift = -ω2shift
|
|
}
|
|
|
|
// Easy cases.
|
|
if len(src[0]) != n+1 || len(dst[0]) != n+1 {
|
|
panic("len(src[0]) != n+1 || len(dst[0]) != n+1")
|
|
}
|
|
switch size {
|
|
case 0:
|
|
copy(dst[0], src[0])
|
|
return
|
|
case 1:
|
|
dst[0].Add(src[0], src[1<<idxShift]) // dst[0] = src[0] + src[1]
|
|
dst[1].Sub(src[0], src[1<<idxShift]) // dst[1] = src[0] - src[1]
|
|
return
|
|
}
|
|
|
|
// Let P(x) = src[0] + src[1<<idxShift] * x + ... + src[K-1 << idxShift] * x^(K-1)
|
|
// The P(x) = Q1(x²) + x*Q2(x²)
|
|
// where Q1's coefficients are src with indices shifted by 1
|
|
// where Q2's coefficients are src[1<<idxShift:] with indices shifted by 1
|
|
|
|
// Split destination vectors in halves.
|
|
dst1 := dst[:1<<(size-1)]
|
|
dst2 := dst[1<<(size-1):]
|
|
// Transform Q1 and Q2 in the halves.
|
|
rec(dst1, src, size-1)
|
|
rec(dst2, src[1<<idxShift:], size-1)
|
|
|
|
// Reconstruct P's transform from transforms of Q1 and Q2.
|
|
// dst[i] is dst1[i] + ω^i * dst2[i]
|
|
// dst[i + 1<<(k-1)] is dst1[i] + ω^(i+K/2) * dst2[i]
|
|
//
|
|
for i := range dst1 {
|
|
tmp.ShiftHalf(dst2[i], i*ω2shift, tmp2) // ω^i * dst2[i]
|
|
dst2[i].Sub(dst1[i], tmp)
|
|
dst1[i].Add(dst1[i], tmp)
|
|
}
|
|
}
|
|
rec(dst, src, k)
|
|
}
|
|
|
|
// Mul returns the pointwise product of p and q.
|
|
func (p *polValues) Mul(q *polValues) (r polValues) {
|
|
n := p.n
|
|
r.k, r.n = p.k, p.n
|
|
r.values = make([]fermat, len(p.values))
|
|
bits := make([]big.Word, len(p.values)*(n+1))
|
|
buf := make(fermat, 8*n)
|
|
for i := range r.values {
|
|
r.values[i] = bits[i*(n+1) : (i+1)*(n+1)]
|
|
z := buf.Mul(p.values[i], q.values[i])
|
|
copy(r.values[i], z)
|
|
}
|
|
return
|
|
}
|