mirror of
https://github.com/golang/go
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93bcf91299
Substition -> Substitution
Change-Id: Iede578d733d1c041133742b61eb0573c3bd3b17c
GitHub-Last-Rev: 7815bd346d
GitHub-Pull-Request: golang/go#38059
Reviewed-on: https://go-review.googlesource.com/c/go/+/225417
Run-TryBot: Ian Lance Taylor <iant@golang.org>
TryBot-Result: Gobot Gobot <gobot@golang.org>
Reviewed-by: Ian Lance Taylor <iant@golang.org>
755 lines
13 KiB
Go
755 lines
13 KiB
Go
// run
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// Copyright 2009 The Go Authors. All rights reserved.
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// Use of this source code is governed by a BSD-style
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// license that can be found in the LICENSE file.
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// Test concurrency primitives: power series.
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// Like powser1.go but uses channels of interfaces.
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// Has not been cleaned up as much as powser1.go, to keep
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// it distinct and therefore a different test.
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// Power series package
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// A power series is a channel, along which flow rational
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// coefficients. A denominator of zero signifies the end.
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// Original code in Newsqueak by Doug McIlroy.
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// See Squinting at Power Series by Doug McIlroy,
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// https://swtch.com/~rsc/thread/squint.pdf
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package main
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import "os"
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type rat struct {
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num, den int64 // numerator, denominator
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}
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type item interface {
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pr()
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eq(c item) bool
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}
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func (u *rat) pr() {
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if u.den == 1 {
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print(u.num)
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} else {
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print(u.num, "/", u.den)
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}
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print(" ")
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}
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func (u *rat) eq(c item) bool {
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c1 := c.(*rat)
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return u.num == c1.num && u.den == c1.den
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}
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type dch struct {
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req chan int
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dat chan item
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nam int
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}
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type dch2 [2]*dch
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var chnames string
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var chnameserial int
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var seqno int
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func mkdch() *dch {
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c := chnameserial % len(chnames)
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chnameserial++
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d := new(dch)
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d.req = make(chan int)
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d.dat = make(chan item)
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d.nam = c
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return d
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}
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func mkdch2() *dch2 {
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d2 := new(dch2)
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d2[0] = mkdch()
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d2[1] = mkdch()
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return d2
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}
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// split reads a single demand channel and replicates its
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// output onto two, which may be read at different rates.
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// A process is created at first demand for an item and dies
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// after the item has been sent to both outputs.
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// When multiple generations of split exist, the newest
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// will service requests on one channel, which is
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// always renamed to be out[0]; the oldest will service
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// requests on the other channel, out[1]. All generations but the
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// newest hold queued data that has already been sent to
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// out[0]. When data has finally been sent to out[1],
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// a signal on the release-wait channel tells the next newer
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// generation to begin servicing out[1].
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func dosplit(in *dch, out *dch2, wait chan int) {
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both := false // do not service both channels
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select {
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case <-out[0].req:
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case <-wait:
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both = true
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select {
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case <-out[0].req:
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case <-out[1].req:
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out[0], out[1] = out[1], out[0]
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}
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}
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seqno++
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in.req <- seqno
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release := make(chan int)
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go dosplit(in, out, release)
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dat := <-in.dat
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out[0].dat <- dat
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if !both {
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<-wait
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}
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<-out[1].req
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out[1].dat <- dat
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release <- 0
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}
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func split(in *dch, out *dch2) {
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release := make(chan int)
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go dosplit(in, out, release)
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release <- 0
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}
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func put(dat item, out *dch) {
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<-out.req
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out.dat <- dat
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}
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func get(in *dch) *rat {
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seqno++
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in.req <- seqno
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return (<-in.dat).(*rat)
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}
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// Get one item from each of n demand channels
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func getn(in []*dch) []item {
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n := len(in)
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if n != 2 {
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panic("bad n in getn")
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}
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req := make([]chan int, 2)
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dat := make([]chan item, 2)
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out := make([]item, 2)
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var i int
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var it item
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for i = 0; i < n; i++ {
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req[i] = in[i].req
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dat[i] = nil
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}
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for n = 2 * n; n > 0; n-- {
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seqno++
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select {
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case req[0] <- seqno:
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dat[0] = in[0].dat
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req[0] = nil
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case req[1] <- seqno:
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dat[1] = in[1].dat
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req[1] = nil
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case it = <-dat[0]:
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out[0] = it
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dat[0] = nil
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case it = <-dat[1]:
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out[1] = it
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dat[1] = nil
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}
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}
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return out
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}
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// Get one item from each of 2 demand channels
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func get2(in0 *dch, in1 *dch) []item {
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return getn([]*dch{in0, in1})
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}
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func copy(in *dch, out *dch) {
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for {
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<-out.req
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out.dat <- get(in)
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}
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}
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func repeat(dat item, out *dch) {
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for {
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put(dat, out)
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}
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}
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type PS *dch // power series
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type PS2 *[2]PS // pair of power series
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var Ones PS
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var Twos PS
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func mkPS() *dch {
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return mkdch()
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}
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func mkPS2() *dch2 {
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return mkdch2()
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}
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// Conventions
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// Upper-case for power series.
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// Lower-case for rationals.
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// Input variables: U,V,...
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// Output variables: ...,Y,Z
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// Integer gcd; needed for rational arithmetic
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func gcd(u, v int64) int64 {
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if u < 0 {
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return gcd(-u, v)
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}
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if u == 0 {
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return v
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}
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return gcd(v%u, u)
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}
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// Make a rational from two ints and from one int
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func i2tor(u, v int64) *rat {
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g := gcd(u, v)
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r := new(rat)
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if v > 0 {
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r.num = u / g
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r.den = v / g
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} else {
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r.num = -u / g
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r.den = -v / g
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}
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return r
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}
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func itor(u int64) *rat {
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return i2tor(u, 1)
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}
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var zero *rat
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var one *rat
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// End mark and end test
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var finis *rat
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func end(u *rat) int64 {
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if u.den == 0 {
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return 1
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}
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return 0
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}
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// Operations on rationals
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func add(u, v *rat) *rat {
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g := gcd(u.den, v.den)
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return i2tor(u.num*(v.den/g)+v.num*(u.den/g), u.den*(v.den/g))
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}
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func mul(u, v *rat) *rat {
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g1 := gcd(u.num, v.den)
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g2 := gcd(u.den, v.num)
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r := new(rat)
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r.num = (u.num / g1) * (v.num / g2)
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r.den = (u.den / g2) * (v.den / g1)
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return r
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}
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func neg(u *rat) *rat {
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return i2tor(-u.num, u.den)
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}
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func sub(u, v *rat) *rat {
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return add(u, neg(v))
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}
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func inv(u *rat) *rat { // invert a rat
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if u.num == 0 {
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panic("zero divide in inv")
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}
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return i2tor(u.den, u.num)
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}
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// print eval in floating point of PS at x=c to n terms
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func Evaln(c *rat, U PS, n int) {
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xn := float64(1)
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x := float64(c.num) / float64(c.den)
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val := float64(0)
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for i := 0; i < n; i++ {
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u := get(U)
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if end(u) != 0 {
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break
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}
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val = val + x*float64(u.num)/float64(u.den)
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xn = xn * x
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}
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print(val, "\n")
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}
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// Print n terms of a power series
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func Printn(U PS, n int) {
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done := false
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for ; !done && n > 0; n-- {
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u := get(U)
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if end(u) != 0 {
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done = true
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} else {
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u.pr()
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}
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}
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print(("\n"))
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}
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func Print(U PS) {
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Printn(U, 1000000000)
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}
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// Evaluate n terms of power series U at x=c
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func eval(c *rat, U PS, n int) *rat {
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if n == 0 {
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return zero
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}
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y := get(U)
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if end(y) != 0 {
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return zero
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}
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return add(y, mul(c, eval(c, U, n-1)))
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}
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// Power-series constructors return channels on which power
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// series flow. They start an encapsulated generator that
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// puts the terms of the series on the channel.
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// Make a pair of power series identical to a given power series
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func Split(U PS) *dch2 {
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UU := mkdch2()
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go split(U, UU)
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return UU
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}
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// Add two power series
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func Add(U, V PS) PS {
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Z := mkPS()
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go func(U, V, Z PS) {
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var uv []item
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for {
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<-Z.req
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uv = get2(U, V)
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switch end(uv[0].(*rat)) + 2*end(uv[1].(*rat)) {
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case 0:
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Z.dat <- add(uv[0].(*rat), uv[1].(*rat))
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case 1:
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Z.dat <- uv[1]
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copy(V, Z)
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case 2:
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Z.dat <- uv[0]
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copy(U, Z)
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case 3:
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Z.dat <- finis
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}
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}
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}(U, V, Z)
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return Z
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}
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// Multiply a power series by a constant
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func Cmul(c *rat, U PS) PS {
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Z := mkPS()
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go func(c *rat, U, Z PS) {
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done := false
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for !done {
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<-Z.req
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u := get(U)
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if end(u) != 0 {
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done = true
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} else {
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Z.dat <- mul(c, u)
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}
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}
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Z.dat <- finis
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}(c, U, Z)
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return Z
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}
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// Subtract
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func Sub(U, V PS) PS {
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return Add(U, Cmul(neg(one), V))
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}
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// Multiply a power series by the monomial x^n
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func Monmul(U PS, n int) PS {
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Z := mkPS()
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go func(n int, U PS, Z PS) {
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for ; n > 0; n-- {
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put(zero, Z)
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}
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copy(U, Z)
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}(n, U, Z)
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return Z
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}
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// Multiply by x
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func Xmul(U PS) PS {
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return Monmul(U, 1)
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}
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func Rep(c *rat) PS {
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Z := mkPS()
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go repeat(c, Z)
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return Z
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}
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// Monomial c*x^n
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func Mon(c *rat, n int) PS {
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Z := mkPS()
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go func(c *rat, n int, Z PS) {
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if c.num != 0 {
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for ; n > 0; n = n - 1 {
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put(zero, Z)
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}
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put(c, Z)
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}
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put(finis, Z)
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}(c, n, Z)
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return Z
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}
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func Shift(c *rat, U PS) PS {
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Z := mkPS()
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go func(c *rat, U, Z PS) {
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put(c, Z)
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copy(U, Z)
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}(c, U, Z)
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return Z
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}
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// simple pole at 1: 1/(1-x) = 1 1 1 1 1 ...
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// Convert array of coefficients, constant term first
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// to a (finite) power series
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/*
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func Poly(a [] *rat) PS{
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Z:=mkPS()
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begin func(a [] *rat, Z PS){
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j:=0
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done:=0
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for j=len(a); !done&&j>0; j=j-1)
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if(a[j-1].num!=0) done=1
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i:=0
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for(; i<j; i=i+1) put(a[i],Z)
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put(finis,Z)
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}()
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return Z
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}
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*/
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// Multiply. The algorithm is
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// let U = u + x*UU
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// let V = v + x*VV
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// then UV = u*v + x*(u*VV+v*UU) + x*x*UU*VV
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func Mul(U, V PS) PS {
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Z := mkPS()
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go func(U, V, Z PS) {
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<-Z.req
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uv := get2(U, V)
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if end(uv[0].(*rat)) != 0 || end(uv[1].(*rat)) != 0 {
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Z.dat <- finis
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} else {
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Z.dat <- mul(uv[0].(*rat), uv[1].(*rat))
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UU := Split(U)
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VV := Split(V)
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W := Add(Cmul(uv[0].(*rat), VV[0]), Cmul(uv[1].(*rat), UU[0]))
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<-Z.req
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Z.dat <- get(W)
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copy(Add(W, Mul(UU[1], VV[1])), Z)
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}
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}(U, V, Z)
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return Z
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}
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// Differentiate
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func Diff(U PS) PS {
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Z := mkPS()
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go func(U, Z PS) {
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<-Z.req
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u := get(U)
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if end(u) == 0 {
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done := false
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for i := 1; !done; i++ {
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u = get(U)
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if end(u) != 0 {
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done = true
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} else {
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Z.dat <- mul(itor(int64(i)), u)
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<-Z.req
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}
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}
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}
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Z.dat <- finis
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}(U, Z)
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return Z
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}
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// Integrate, with const of integration
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func Integ(c *rat, U PS) PS {
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Z := mkPS()
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go func(c *rat, U, Z PS) {
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put(c, Z)
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done := false
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for i := 1; !done; i++ {
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<-Z.req
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u := get(U)
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if end(u) != 0 {
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done = true
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}
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Z.dat <- mul(i2tor(1, int64(i)), u)
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}
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Z.dat <- finis
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}(c, U, Z)
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return Z
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}
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// Binomial theorem (1+x)^c
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func Binom(c *rat) PS {
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Z := mkPS()
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go func(c *rat, Z PS) {
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n := 1
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t := itor(1)
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for c.num != 0 {
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put(t, Z)
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t = mul(mul(t, c), i2tor(1, int64(n)))
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c = sub(c, one)
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n++
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}
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put(finis, Z)
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}(c, Z)
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return Z
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}
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// Reciprocal of a power series
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// let U = u + x*UU
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// let Z = z + x*ZZ
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// (u+x*UU)*(z+x*ZZ) = 1
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// z = 1/u
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// u*ZZ + z*UU +x*UU*ZZ = 0
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// ZZ = -UU*(z+x*ZZ)/u
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func Recip(U PS) PS {
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Z := mkPS()
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go func(U, Z PS) {
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ZZ := mkPS2()
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<-Z.req
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z := inv(get(U))
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Z.dat <- z
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split(Mul(Cmul(neg(z), U), Shift(z, ZZ[0])), ZZ)
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copy(ZZ[1], Z)
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}(U, Z)
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return Z
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}
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// Exponential of a power series with constant term 0
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// (nonzero constant term would make nonrational coefficients)
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// bug: the constant term is simply ignored
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// Z = exp(U)
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// DZ = Z*DU
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// integrate to get Z
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func Exp(U PS) PS {
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ZZ := mkPS2()
|
|
split(Integ(one, Mul(ZZ[0], Diff(U))), ZZ)
|
|
return ZZ[1]
|
|
}
|
|
|
|
// Substitute V for x in U, where the leading term of V is zero
|
|
// let U = u + x*UU
|
|
// let V = v + x*VV
|
|
// then S(U,V) = u + VV*S(V,UU)
|
|
// bug: a nonzero constant term is ignored
|
|
|
|
func Subst(U, V PS) PS {
|
|
Z := mkPS()
|
|
go func(U, V, Z PS) {
|
|
VV := Split(V)
|
|
<-Z.req
|
|
u := get(U)
|
|
Z.dat <- u
|
|
if end(u) == 0 {
|
|
if end(get(VV[0])) != 0 {
|
|
put(finis, Z)
|
|
} else {
|
|
copy(Mul(VV[0], Subst(U, VV[1])), Z)
|
|
}
|
|
}
|
|
}(U, V, Z)
|
|
return Z
|
|
}
|
|
|
|
// Monomial Substitution: U(c x^n)
|
|
// Each Ui is multiplied by c^i and followed by n-1 zeros
|
|
|
|
func MonSubst(U PS, c0 *rat, n int) PS {
|
|
Z := mkPS()
|
|
go func(U, Z PS, c0 *rat, n int) {
|
|
c := one
|
|
for {
|
|
<-Z.req
|
|
u := get(U)
|
|
Z.dat <- mul(u, c)
|
|
c = mul(c, c0)
|
|
if end(u) != 0 {
|
|
Z.dat <- finis
|
|
break
|
|
}
|
|
for i := 1; i < n; i++ {
|
|
<-Z.req
|
|
Z.dat <- zero
|
|
}
|
|
}
|
|
}(U, Z, c0, n)
|
|
return Z
|
|
}
|
|
|
|
func Init() {
|
|
chnameserial = -1
|
|
seqno = 0
|
|
chnames = "ABCDEFGHIJKLMNOPQRSTUVWXYZabcdefghijklmnopqrstuvwxyz"
|
|
zero = itor(0)
|
|
one = itor(1)
|
|
finis = i2tor(1, 0)
|
|
Ones = Rep(one)
|
|
Twos = Rep(itor(2))
|
|
}
|
|
|
|
func check(U PS, c *rat, count int, str string) {
|
|
for i := 0; i < count; i++ {
|
|
r := get(U)
|
|
if !r.eq(c) {
|
|
print("got: ")
|
|
r.pr()
|
|
print("should get ")
|
|
c.pr()
|
|
print("\n")
|
|
panic(str)
|
|
}
|
|
}
|
|
}
|
|
|
|
const N = 10
|
|
|
|
func checka(U PS, a []*rat, str string) {
|
|
for i := 0; i < N; i++ {
|
|
check(U, a[i], 1, str)
|
|
}
|
|
}
|
|
|
|
func main() {
|
|
Init()
|
|
if len(os.Args) > 1 { // print
|
|
print("Ones: ")
|
|
Printn(Ones, 10)
|
|
print("Twos: ")
|
|
Printn(Twos, 10)
|
|
print("Add: ")
|
|
Printn(Add(Ones, Twos), 10)
|
|
print("Diff: ")
|
|
Printn(Diff(Ones), 10)
|
|
print("Integ: ")
|
|
Printn(Integ(zero, Ones), 10)
|
|
print("CMul: ")
|
|
Printn(Cmul(neg(one), Ones), 10)
|
|
print("Sub: ")
|
|
Printn(Sub(Ones, Twos), 10)
|
|
print("Mul: ")
|
|
Printn(Mul(Ones, Ones), 10)
|
|
print("Exp: ")
|
|
Printn(Exp(Ones), 15)
|
|
print("MonSubst: ")
|
|
Printn(MonSubst(Ones, neg(one), 2), 10)
|
|
print("ATan: ")
|
|
Printn(Integ(zero, MonSubst(Ones, neg(one), 2)), 10)
|
|
} else { // test
|
|
check(Ones, one, 5, "Ones")
|
|
check(Add(Ones, Ones), itor(2), 0, "Add Ones Ones") // 1 1 1 1 1
|
|
check(Add(Ones, Twos), itor(3), 0, "Add Ones Twos") // 3 3 3 3 3
|
|
a := make([]*rat, N)
|
|
d := Diff(Ones)
|
|
for i := 0; i < N; i++ {
|
|
a[i] = itor(int64(i + 1))
|
|
}
|
|
checka(d, a, "Diff") // 1 2 3 4 5
|
|
in := Integ(zero, Ones)
|
|
a[0] = zero // integration constant
|
|
for i := 1; i < N; i++ {
|
|
a[i] = i2tor(1, int64(i))
|
|
}
|
|
checka(in, a, "Integ") // 0 1 1/2 1/3 1/4 1/5
|
|
check(Cmul(neg(one), Twos), itor(-2), 10, "CMul") // -1 -1 -1 -1 -1
|
|
check(Sub(Ones, Twos), itor(-1), 0, "Sub Ones Twos") // -1 -1 -1 -1 -1
|
|
m := Mul(Ones, Ones)
|
|
for i := 0; i < N; i++ {
|
|
a[i] = itor(int64(i + 1))
|
|
}
|
|
checka(m, a, "Mul") // 1 2 3 4 5
|
|
e := Exp(Ones)
|
|
a[0] = itor(1)
|
|
a[1] = itor(1)
|
|
a[2] = i2tor(3, 2)
|
|
a[3] = i2tor(13, 6)
|
|
a[4] = i2tor(73, 24)
|
|
a[5] = i2tor(167, 40)
|
|
a[6] = i2tor(4051, 720)
|
|
a[7] = i2tor(37633, 5040)
|
|
a[8] = i2tor(43817, 4480)
|
|
a[9] = i2tor(4596553, 362880)
|
|
checka(e, a, "Exp") // 1 1 3/2 13/6 73/24
|
|
at := Integ(zero, MonSubst(Ones, neg(one), 2))
|
|
for c, i := 1, 0; i < N; i++ {
|
|
if i%2 == 0 {
|
|
a[i] = zero
|
|
} else {
|
|
a[i] = i2tor(int64(c), int64(i))
|
|
c *= -1
|
|
}
|
|
}
|
|
checka(at, a, "ATan") // 0 -1 0 -1/3 0 -1/5
|
|
/*
|
|
t := Revert(Integ(zero, MonSubst(Ones, neg(one), 2)))
|
|
a[0] = zero
|
|
a[1] = itor(1)
|
|
a[2] = zero
|
|
a[3] = i2tor(1,3)
|
|
a[4] = zero
|
|
a[5] = i2tor(2,15)
|
|
a[6] = zero
|
|
a[7] = i2tor(17,315)
|
|
a[8] = zero
|
|
a[9] = i2tor(62,2835)
|
|
checka(t, a, "Tan") // 0 1 0 1/3 0 2/15
|
|
*/
|
|
}
|
|
}
|