The full text of this article is unavailable through your IP address: 3.17.181.181
Contents Online
Communications in Mathematical Sciences
Volume 22 (2024)
Number 1
Description of random level sets by polynomial chaos expansions
Pages: 95 – 112
DOI: https://dx.doi.org/10.4310/CMS.2024.v22.n1.a4
Authors
Abstract
We present a novel approach to determine the evolution of level sets under uncertainties in their velocity fields. This leads to a stochastic description of level sets. To compute the quantiles of random level sets, we use the stochastic Galerkin method for a hyperbolic reformulation of the equations for the propagation of level sets. A novel intrusive Galerkin formulation is presented and proven to be hyperbolic. It induces a corresponding finite-volume scheme that is specifically tailored to uncertain velocities.
Keywords
level sets, uncertainty quantification, Hamilton–Jacobi equations, hyperbolic conservation laws, stochastic Galerkin, finite-volume method
2010 Mathematics Subject Classification
35F21, 37L45, 60D05, 60H15
Received 15 October 2021
Received revised 18 September 2022
Accepted 8 May 2023
Published 7 December 2023