Mon, 05 Dec 2022 23:50:22 +0200
Zenodo packaging hacks
//! Implementation of the standard mollifier use rgsl::hypergeometric::hyperg_U; use float_extras::f64::{tgamma as gamma}; use numeric_literals::replace_float_literals; use serde::Serialize; use alg_tools::types::*; use alg_tools::euclidean::Euclidean; use alg_tools::norms::*; use alg_tools::loc::Loc; use alg_tools::sets::Cube; use alg_tools::bisection_tree::{ Support, Constant, Bounds, LocalAnalysis, GlobalAnalysis }; use alg_tools::mapping::Apply; use alg_tools::maputil::array_init; /// Reresentation of the (unnormalised) standard mollifier. /// /// For the `width` parameter $ε>0$, this is /// <div>$$ /// f(x)=\begin{cases} /// e^{\frac{ε^2}{\|x\|_2^2-ε^2}}, & \|x\|_2 < ε, \\ /// 0, & \text{otherwise}. /// \end{cases} /// $$</div> #[derive(Copy,Clone,Serialize,Debug,Eq,PartialEq)] pub struct Mollifier<C : Constant, const N : usize> { /// The parameter $ε$ of the mollifier. pub width : C, } #[replace_float_literals(C::Type::cast_from(literal))] impl<'a, C : Constant, const N : usize> Apply<&'a Loc<C::Type, N>> for Mollifier<C, N> { type Output = C::Type; #[inline] fn apply(&self, x : &'a Loc<C::Type, N>) -> Self::Output { let ε = self.width.value(); let ε2 = ε*ε; let n2 = x.norm2_squared(); if n2 < ε2 { (n2 / (n2 - ε2)).exp() } else { 0.0 } } } impl<C : Constant, const N : usize> Apply<Loc<C::Type, N>> for Mollifier<C, N> { type Output = C::Type; #[inline] fn apply(&self, x : Loc<C::Type, N>) -> Self::Output { self.apply(&x) } } impl<'a, C : Constant, const N : usize> Support<C::Type, N> for Mollifier<C, N> { #[inline] fn support_hint(&self) -> Cube<C::Type,N> { let ε = self.width.value(); array_init(|| [-ε, ε]).into() } #[inline] fn in_support(&self, x : &Loc<C::Type,N>) -> bool { x.norm2() < self.width.value() } /*fn fully_in_support(&self, _cube : &Cube<C::Type,N>) -> bool { todo!("Not implemented, but not used at the moment") }*/ } #[replace_float_literals(C::Type::cast_from(literal))] impl<'a, C : Constant, const N : usize> GlobalAnalysis<C::Type, Bounds<C::Type>> for Mollifier<C, N> { #[inline] fn global_analysis(&self) -> Bounds<C::Type> { // The function is maximised/minimised where the 2-norm is minimised/maximised. Bounds(0.0, 1.0) } } impl<'a, C : Constant, const N : usize> LocalAnalysis<C::Type, Bounds<C::Type>, N> for Mollifier<C, N> { #[inline] fn local_analysis(&self, cube : &Cube<C::Type, N>) -> Bounds<C::Type> { // The function is maximised/minimised where the 2-norm is minimised/maximised. let lower = self.apply(cube.maxnorm_point()); let upper = self.apply(cube.minnorm_point()); Bounds(lower, upper) } } /// Calculate integral of the standard mollifier of width 1 in $ℝ^n$. /// /// This is based on the formula from /// [https://math.stackexchange.com/questions/4359683/integral-of-the-usual-mollifier-function-finding-its-necessary-constant](). /// /// If `rescaled` is `true`, return the integral of the scaled mollifier that has value one at the /// origin. #[inline] pub fn mollifier_norm1(n_ : usize, rescaled : bool) -> f64 { assert!(n_ > 0); let n = n_ as f64; let q = 2.0; let p = 2.0; let base = (2.0*gamma(1.0 + 1.0/p)).powi(n_ as i32) /*/ gamma(1.0 + n / p) * gamma(1.0 + n / q)*/ * hyperg_U(1.0 + n / q, 2.0, 1.0); if rescaled { base } else { base / f64::E } } impl<'a, C : Constant, const N : usize> Norm<C::Type, L1> for Mollifier<C, N> { #[inline] fn norm(&self, _ : L1) -> C::Type { let ε = self.width.value(); C::Type::cast_from(mollifier_norm1(N, true)) * ε.powi(N as i32) } } #[replace_float_literals(C::Type::cast_from(literal))] impl<'a, C : Constant, const N : usize> Norm<C::Type, Linfinity> for Mollifier<C, N> { #[inline] fn norm(&self, _ : Linfinity) -> C::Type { 1.0 } }