Random sampling and unisolvent interpolation by almost everywhere analytic functions

03/24/2023

∙

We prove a.s. (almost sure) unisolvency of interpolation by continuous random sampling with respect to any given density, in spaces of multivariate a.e. (almost everywhere) analytic functions. Examples are given concerning polynomial and RBF approximation.

READ FULL TEXT

Random sampling and unisolvent interpolation by almost everywhere analytic functions

Multivariate fractal interpolation functions: Some approximation aspects and an associated fractal interpolation operator

Dispersion relation reconstruction for 2D Photonic Crystals based on polynomial interpolation

Generalised Recombination Interpolation Method (GRIM)

How simplifying and flexible is the simplifying assumption in pair-copula constructions – some analytic answers in dimension three and beyond

Multivariate Interpolation on Unisolvent Nodes – Lifting the Curse of Dimensionality

On the Universality of the Double Descent Peak in Ridgeless Regression

Efficient barycentric point sampling on meshes

Random sampling and unisolvent interpolation by almost everywhere analytic functions

Related Research

Multivariate fractal interpolation functions: Some approximation aspects and an associated fractal interpolation operator

Dispersion relation reconstruction for 2D Photonic Crystals based on polynomial interpolation

Generalised Recombination Interpolation Method (GRIM)

How simplifying and flexible is the simplifying assumption in pair-copula constructions – some analytic answers in dimension three and beyond

Multivariate Interpolation on Unisolvent Nodes – Lifting the Curse of Dimensionality

On the Universality of the Double Descent Peak in Ridgeless Regression

Efficient barycentric point sampling on meshes