third_party/golibs/vendor/gonum.org/v1/gonum/mathext/gamma_inc.go - fuchsia - Git at Google

 // Copyright ©2016 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 mathext

 import (
 	"gonum.org/v1/gonum/mathext/internal/cephes"
 )

 // GammaIncReg computes the regularized incomplete Gamma integral.
 //  GammaIncReg(a,x) = (1/ Γ(a)) \int_0^x e^{-t} t^{a-1} dt
 // The input argument a must be positive and x must be non-negative or GammaIncReg
 // will panic.
 //
 // See http://mathworld.wolfram.com/IncompleteGammaFunction.html
 // or https://en.wikipedia.org/wiki/Incomplete_gamma_function for more detailed
 // information.
 func GammaIncReg(a, x float64) float64 {
 	return cephes.Igam(a, x)
 }

 // GammaIncRegComp computes the complemented regularized incomplete Gamma integral.
 //  GammaIncRegComp(a,x) = 1 - GammaIncReg(a,x)
 //                       = (1/ Γ(a)) \int_x^\infty e^{-t} t^{a-1} dt
 // The input argument a must be positive and x must be non-negative or
 // GammaIncRegComp will panic.
 func GammaIncRegComp(a, x float64) float64 {
 	return cephes.IgamC(a, x)
 }

 // GammaIncRegInv computes the inverse of the regularized incomplete Gamma integral. That is,
 // it returns the x such that:
 //  GammaIncReg(a, x) = y
 // The input argument a must be positive and y must be between 0 and 1
 // inclusive or GammaIncRegInv will panic. GammaIncRegInv should return a positive
 // number, but can return NaN if there is a failure to converge.
 func GammaIncRegInv(a, y float64) float64 {
 	return gammaIncRegInv(a, y)
 }

 // GammaIncRegCompInv computes the inverse of the complemented regularized incomplete Gamma
 // integral. That is, it returns the x such that:
 //  GammaIncRegComp(a, x) = y
 // The input argument a must be positive and y must be between 0 and 1
 // inclusive or GammaIncRegCompInv will panic. GammaIncRegCompInv should return a
 // positive number, but can return 0 even with non-zero y due to underflow.
 func GammaIncRegCompInv(a, y float64) float64 {
 	return cephes.IgamI(a, y)
 }
	// Copyright ©2016 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 mathext

	import (
	"gonum.org/v1/gonum/mathext/internal/cephes"
	)

	// GammaIncReg computes the regularized incomplete Gamma integral.
	// GammaIncReg(a,x) = (1/ Γ(a)) \int_0^x e^{-t} t^{a-1} dt
	// The input argument a must be positive and x must be non-negative or GammaIncReg
	// will panic.
	//
	// See http://mathworld.wolfram.com/IncompleteGammaFunction.html
	// or https://en.wikipedia.org/wiki/Incomplete_gamma_function for more detailed
	// information.
	func GammaIncReg(a, x float64) float64 {
	return cephes.Igam(a, x)
	}

	// GammaIncRegComp computes the complemented regularized incomplete Gamma integral.
	// GammaIncRegComp(a,x) = 1 - GammaIncReg(a,x)
	// = (1/ Γ(a)) \int_x^\infty e^{-t} t^{a-1} dt
	// The input argument a must be positive and x must be non-negative or
	// GammaIncRegComp will panic.
	func GammaIncRegComp(a, x float64) float64 {
	return cephes.IgamC(a, x)
	}

	// GammaIncRegInv computes the inverse of the regularized incomplete Gamma integral. That is,
	// it returns the x such that:
	// GammaIncReg(a, x) = y
	// The input argument a must be positive and y must be between 0 and 1
	// inclusive or GammaIncRegInv will panic. GammaIncRegInv should return a positive
	// number, but can return NaN if there is a failure to converge.
	func GammaIncRegInv(a, y float64) float64 {
	return gammaIncRegInv(a, y)
	}

	// GammaIncRegCompInv computes the inverse of the complemented regularized incomplete Gamma
	// integral. That is, it returns the x such that:
	// GammaIncRegComp(a, x) = y
	// The input argument a must be positive and y must be between 0 and 1
	// inclusive or GammaIncRegCompInv will panic. GammaIncRegCompInv should return a
	// positive number, but can return 0 even with non-zero y due to underflow.
	func GammaIncRegCompInv(a, y float64) float64 {
	return cephes.IgamI(a, y)
	}