| // Copyright ©2018 The Gonum Authors. All rights reserved. |
| // Use of this source code is governed by a BSD-style |
| // license that can be found in the LICENSE file. |
| |
| package hyperdual |
| |
| import ( |
| "fmt" |
| "math" |
| "strings" |
| ) |
| |
| // Number is a float64 precision hyperdual number. |
| type Number struct { |
| Real, E1mag, E2mag, E1E2mag float64 |
| } |
| |
| var negZero = math.Float64frombits(1 << 63) |
| |
| // Format implements fmt.Formatter. |
| func (d Number) Format(fs fmt.State, c rune) { |
| prec, pOk := fs.Precision() |
| if !pOk { |
| prec = -1 |
| } |
| width, wOk := fs.Width() |
| if !wOk { |
| width = -1 |
| } |
| switch c { |
| case 'v': |
| if fs.Flag('#') { |
| fmt.Fprintf(fs, "%T{Real:%#v, E1mag:%#v, E2mag:%#v, E1E2mag:%#v}", d, d.Real, d.E1mag, d.E2mag, d.E1E2mag) |
| return |
| } |
| if fs.Flag('+') { |
| fmt.Fprintf(fs, "{Real:%+v, E1mag:%+v, E2mag:%+v, E1E2mag:%+v}", d.Real, d.E1mag, d.E2mag, d.E1E2mag) |
| return |
| } |
| c = 'g' |
| prec = -1 |
| fallthrough |
| case 'e', 'E', 'f', 'F', 'g', 'G': |
| fre := fmtString(fs, c, prec, width, false) |
| fim := fmtString(fs, c, prec, width, true) |
| fmt.Fprintf(fs, fmt.Sprintf("(%s%[2]sϵ₁%[2]sϵ₂%[2]sϵ₁ϵ₂)", fre, fim), d.Real, d.E1mag, d.E2mag, d.E1E2mag) |
| default: |
| fmt.Fprintf(fs, "%%!%c(%T=%[2]v)", c, d) |
| return |
| } |
| } |
| |
| // This is horrible, but it's what we have. |
| func fmtString(fs fmt.State, c rune, prec, width int, wantPlus bool) string { |
| var b strings.Builder |
| b.WriteByte('%') |
| for _, f := range "0+- " { |
| if fs.Flag(int(f)) || (f == '+' && wantPlus) { |
| b.WriteByte(byte(f)) |
| } |
| } |
| if width >= 0 { |
| fmt.Fprint(&b, width) |
| } |
| if prec >= 0 { |
| b.WriteByte('.') |
| if prec > 0 { |
| fmt.Fprint(&b, prec) |
| } |
| } |
| b.WriteRune(c) |
| return b.String() |
| } |
| |
| // Add returns the sum of x and y. |
| func Add(x, y Number) Number { |
| return Number{ |
| Real: x.Real + y.Real, |
| E1mag: x.E1mag + y.E1mag, |
| E2mag: x.E2mag + y.E2mag, |
| E1E2mag: x.E1E2mag + y.E1E2mag, |
| } |
| } |
| |
| // Sub returns the difference of x and y, x-y. |
| func Sub(x, y Number) Number { |
| return Number{ |
| Real: x.Real - y.Real, |
| E1mag: x.E1mag - y.E1mag, |
| E2mag: x.E2mag - y.E2mag, |
| E1E2mag: x.E1E2mag - y.E1E2mag, |
| } |
| } |
| |
| // Mul returns the hyperdual product of x and y. |
| func Mul(x, y Number) Number { |
| return Number{ |
| Real: x.Real * y.Real, |
| E1mag: x.Real*y.E1mag + x.E1mag*y.Real, |
| E2mag: x.Real*y.E2mag + x.E2mag*y.Real, |
| E1E2mag: x.Real*y.E1E2mag + x.E1mag*y.E2mag + x.E2mag*y.E1mag + x.E1E2mag*y.Real, |
| } |
| } |
| |
| // Inv returns the hyperdual inverse of d. |
| // |
| // Special cases are: |
| // |
| // Inv(±Inf) = ±0-0ϵ₁-0ϵ₂±0ϵ₁ϵ₂ |
| // Inv(±0) = ±Inf-Infϵ₁-Infϵ₂±Infϵ₁ϵ₂ |
| func Inv(d Number) Number { |
| if d.Real == 0 { |
| return Number{ |
| Real: 1 / d.Real, |
| E1mag: math.Inf(-1), |
| E2mag: math.Inf(-1), |
| E1E2mag: 1 / d.Real, // Return a signed inf from a signed zero. |
| } |
| } |
| d2 := d.Real * d.Real |
| return Number{ |
| Real: 1 / d.Real, |
| E1mag: -d.E1mag / d2, |
| E2mag: -d.E2mag / d2, |
| E1E2mag: -d.E1E2mag/d2 + 2*d.E1mag*d.E2mag/(d2*d.Real), |
| } |
| } |
| |
| // Scale returns d scaled by f. |
| func Scale(f float64, d Number) Number { |
| return Number{Real: f * d.Real, E1mag: f * d.E1mag, E2mag: f * d.E2mag, E1E2mag: f * d.E1E2mag} |
| } |
| |
| // Abs returns the absolute value of d. |
| func Abs(d Number) Number { |
| if math.Float64bits(d.Real)&(1<<63) == 0 { |
| return d |
| } |
| return Scale(-1, d) |
| } |
