Sparsity for parametric PDEs with log-gamma random inputs and applications
Abstract
We propose a novel method for establishing the sparsity of the coefficients of the Laguerre generalized polynomial chaos expansion of solutions to parametric elliptic PDEs with log-gamma inputs on . The established sparsity is quantified by -summability and weighted -summability of the coefficients. Building on these sparsity results, we derive convergence rates for semi-discrete approximations in the parametric variables. These rates apply to sparse-grid polynomial interpolations, extended least-squares approximations and the associated semi-discrete quadrature rules. Moreover, a counterpart of our method for parametric elliptic PDEs with log-normal inputs yields a significant improvement in the sufficient condition for -summability when the component functions in the log-normal representation of the parametric diffusion coefficients have global support, compared with results obtained in prior works.
Cite
@article{arxiv.2603.14813,
title = {Sparsity for parametric PDEs with log-gamma random inputs and applications},
author = {Dinh Dũng and Van Kien Nguyen and Viet Ha Hoang},
journal= {arXiv preprint arXiv:2603.14813},
year = {2026}
}