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authorDaniel Baumann <daniel.baumann@progress-linux.org>2024-04-28 13:14:23 +0000
committerDaniel Baumann <daniel.baumann@progress-linux.org>2024-04-28 13:14:23 +0000
commit73df946d56c74384511a194dd01dbe099584fd1a (patch)
treefd0bcea490dd81327ddfbb31e215439672c9a068 /src/math/big/hilbert_test.go
parentInitial commit. (diff)
downloadgolang-1.16-upstream.tar.xz
golang-1.16-upstream.zip
Adding upstream version 1.16.10.upstream/1.16.10upstream
Signed-off-by: Daniel Baumann <daniel.baumann@progress-linux.org>
Diffstat (limited to 'src/math/big/hilbert_test.go')
-rw-r--r--src/math/big/hilbert_test.go160
1 files changed, 160 insertions, 0 deletions
diff --git a/src/math/big/hilbert_test.go b/src/math/big/hilbert_test.go
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+// Copyright 2009 The Go Authors. All rights reserved.
+// Use of this source code is governed by a BSD-style
+// license that can be found in the LICENSE file.
+
+// A little test program and benchmark for rational arithmetics.
+// Computes a Hilbert matrix, its inverse, multiplies them
+// and verifies that the product is the identity matrix.
+
+package big
+
+import (
+ "fmt"
+ "testing"
+)
+
+type matrix struct {
+ n, m int
+ a []*Rat
+}
+
+func (a *matrix) at(i, j int) *Rat {
+ if !(0 <= i && i < a.n && 0 <= j && j < a.m) {
+ panic("index out of range")
+ }
+ return a.a[i*a.m+j]
+}
+
+func (a *matrix) set(i, j int, x *Rat) {
+ if !(0 <= i && i < a.n && 0 <= j && j < a.m) {
+ panic("index out of range")
+ }
+ a.a[i*a.m+j] = x
+}
+
+func newMatrix(n, m int) *matrix {
+ if !(0 <= n && 0 <= m) {
+ panic("illegal matrix")
+ }
+ a := new(matrix)
+ a.n = n
+ a.m = m
+ a.a = make([]*Rat, n*m)
+ return a
+}
+
+func newUnit(n int) *matrix {
+ a := newMatrix(n, n)
+ for i := 0; i < n; i++ {
+ for j := 0; j < n; j++ {
+ x := NewRat(0, 1)
+ if i == j {
+ x.SetInt64(1)
+ }
+ a.set(i, j, x)
+ }
+ }
+ return a
+}
+
+func newHilbert(n int) *matrix {
+ a := newMatrix(n, n)
+ for i := 0; i < n; i++ {
+ for j := 0; j < n; j++ {
+ a.set(i, j, NewRat(1, int64(i+j+1)))
+ }
+ }
+ return a
+}
+
+func newInverseHilbert(n int) *matrix {
+ a := newMatrix(n, n)
+ for i := 0; i < n; i++ {
+ for j := 0; j < n; j++ {
+ x1 := new(Rat).SetInt64(int64(i + j + 1))
+ x2 := new(Rat).SetInt(new(Int).Binomial(int64(n+i), int64(n-j-1)))
+ x3 := new(Rat).SetInt(new(Int).Binomial(int64(n+j), int64(n-i-1)))
+ x4 := new(Rat).SetInt(new(Int).Binomial(int64(i+j), int64(i)))
+
+ x1.Mul(x1, x2)
+ x1.Mul(x1, x3)
+ x1.Mul(x1, x4)
+ x1.Mul(x1, x4)
+
+ if (i+j)&1 != 0 {
+ x1.Neg(x1)
+ }
+
+ a.set(i, j, x1)
+ }
+ }
+ return a
+}
+
+func (a *matrix) mul(b *matrix) *matrix {
+ if a.m != b.n {
+ panic("illegal matrix multiply")
+ }
+ c := newMatrix(a.n, b.m)
+ for i := 0; i < c.n; i++ {
+ for j := 0; j < c.m; j++ {
+ x := NewRat(0, 1)
+ for k := 0; k < a.m; k++ {
+ x.Add(x, new(Rat).Mul(a.at(i, k), b.at(k, j)))
+ }
+ c.set(i, j, x)
+ }
+ }
+ return c
+}
+
+func (a *matrix) eql(b *matrix) bool {
+ if a.n != b.n || a.m != b.m {
+ return false
+ }
+ for i := 0; i < a.n; i++ {
+ for j := 0; j < a.m; j++ {
+ if a.at(i, j).Cmp(b.at(i, j)) != 0 {
+ return false
+ }
+ }
+ }
+ return true
+}
+
+func (a *matrix) String() string {
+ s := ""
+ for i := 0; i < a.n; i++ {
+ for j := 0; j < a.m; j++ {
+ s += fmt.Sprintf("\t%s", a.at(i, j))
+ }
+ s += "\n"
+ }
+ return s
+}
+
+func doHilbert(t *testing.T, n int) {
+ a := newHilbert(n)
+ b := newInverseHilbert(n)
+ I := newUnit(n)
+ ab := a.mul(b)
+ if !ab.eql(I) {
+ if t == nil {
+ panic("Hilbert failed")
+ }
+ t.Errorf("a = %s\n", a)
+ t.Errorf("b = %s\n", b)
+ t.Errorf("a*b = %s\n", ab)
+ t.Errorf("I = %s\n", I)
+ }
+}
+
+func TestHilbert(t *testing.T) {
+ doHilbert(t, 10)
+}
+
+func BenchmarkHilbert(b *testing.B) {
+ for i := 0; i < b.N; i++ {
+ doHilbert(nil, 10)
+ }
+}