Parameter Error Analysis for the 3D Modified Leray-alpha Model: Analytical and Numerical Approaches

TL;DR

This paper analyzes the parameter errors in the 3D modified Leray-alpha model through analytical proofs and numerical simulations, establishing conditions for solution recovery and validating convergence.

Contribution

It provides the first combined analytical and numerical error analysis for the 3D modified Leray-alpha model, including conditions for solution recovery.

Findings

Proved global well-posedness and continuous dependence.

Derived error bounds for solution recovery.

Validated convergence criteria through numerical simulations.

Abstract

In this study, we conduct a parameter error analysis for the 3D modified Leray-$\alpha$ model using both analytical and numerical approaches. We first prove the global well-posedness and continuous dependence of initial data for the assimilated system. Furthermore, given sufficient conditions on the physical parameters and norms of the true solution, we demonstrate that the true solution can be recovered from the approximation solution, with an error determined by the discrepancy between the true and approximating parameters. Numerical simulations are provided to validate the convergence criteria.