From 7e2b67e69ec8b9b8c842dac02c2225f8a7c781d9 Mon Sep 17 00:00:00 2001 From: "Documenter.jl" Date: Sat, 6 Jul 2024 07:07:52 +0000 Subject: [PATCH] build based on 83c72e2 --- dev/.documenter-siteinfo.json | 2 +- dev/index.html | 2 +- 2 files changed, 2 insertions(+), 2 deletions(-) diff --git a/dev/.documenter-siteinfo.json b/dev/.documenter-siteinfo.json index 6beb6a3..8e27d1c 100644 --- a/dev/.documenter-siteinfo.json +++ b/dev/.documenter-siteinfo.json @@ -1 +1 @@ -{"documenter":{"julia_version":"1.10.4","generation_timestamp":"2024-07-05T22:53:12","documenter_version":"1.5.0"}} \ No newline at end of file +{"documenter":{"julia_version":"1.10.4","generation_timestamp":"2024-07-06T07:07:48","documenter_version":"1.5.0"}} \ No newline at end of file diff --git a/dev/index.html b/dev/index.html index e30de14..3721097 100644 --- a/dev/index.html +++ b/dev/index.html @@ -14,4 +14,4 @@ polynomials::Vector{P} end

Orthogonal polynomial with respect to the univariate weight function $w(x) = \exp(-x^2/2)$ over the interval $[-\infty, \infty]$.

source
MultivariateBases.PhysicistsHermiteType
struct PhysicistsHermite{P} <: AbstractHermite{P}
     polynomials::Vector{P}
-end

Orthogonal polynomial with respect to the univariate weight function $w(x) = \exp(-x^2)$ over the interval $[-\infty, \infty]$.

source
MultivariateBases.LaguerreType
struct LaguerreBasis <: AbstractMultipleOrthogonal end

Orthogonal polynomial with respect to the univariate weight function $w(x) = \exp(-x)$ over the interval $[0, \infty]$.

source
MultivariateBases.AbstractGegenbauerType
struct AbstractGegenbauer <: AbstractMultipleOrthogonal end

Orthogonal polynomial with respect to the univariate weight function $w(x) = (1 - x^2)^{\alpha - 1/2}$ over the interval $[-1, 1]$.

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MultivariateBases.LegendreType
struct Legendre <: AbstractGegenbauer end

Orthogonal polynomial with respect to the univariate weight function $w(x) = 1$ over the interval $[-1, 1]$.

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MultivariateBases.ChebyshevFirstKindType
struct ChebyshevFirstKind <: AbstractChebyshev end

Orthogonal polynomial with respect to the univariate weight function $w(x) = \frac{1}{\sqrt{1 - x^2}}$ over the interval $[-1, 1]$.

source
MultivariateBases.ChebyshevSecondKindType
struct ChebyshevSecondKind <: AbstractChebyshevBasis end

Orthogonal polynomial with respect to the univariate weight function $w(x) = \sqrt{1 - x^2}$ over the interval $[-1, 1]$.

source
+end

Orthogonal polynomial with respect to the univariate weight function $w(x) = \exp(-x^2)$ over the interval $[-\infty, \infty]$.

source
MultivariateBases.LaguerreType
struct LaguerreBasis <: AbstractMultipleOrthogonal end

Orthogonal polynomial with respect to the univariate weight function $w(x) = \exp(-x)$ over the interval $[0, \infty]$.

source
MultivariateBases.AbstractGegenbauerType
struct AbstractGegenbauer <: AbstractMultipleOrthogonal end

Orthogonal polynomial with respect to the univariate weight function $w(x) = (1 - x^2)^{\alpha - 1/2}$ over the interval $[-1, 1]$.

source
MultivariateBases.LegendreType
struct Legendre <: AbstractGegenbauer end

Orthogonal polynomial with respect to the univariate weight function $w(x) = 1$ over the interval $[-1, 1]$.

source
MultivariateBases.ChebyshevFirstKindType
struct ChebyshevFirstKind <: AbstractChebyshev end

Orthogonal polynomial with respect to the univariate weight function $w(x) = \frac{1}{\sqrt{1 - x^2}}$ over the interval $[-1, 1]$.

source
MultivariateBases.ChebyshevSecondKindType
struct ChebyshevSecondKind <: AbstractChebyshevBasis end

Orthogonal polynomial with respect to the univariate weight function $w(x) = \sqrt{1 - x^2}$ over the interval $[-1, 1]$.

source