Higher-order multiscale method and its convergence analysis for nonlinear thermo-electric coupling problems of composite structures

TL;DR

This paper introduces a higher-order multiscale computational method for nonlinear thermo-electric problems in composite structures, achieving high accuracy and efficiency through novel formulations and convergence analysis.

Contribution

It develops a new higher-order multiscale formulation with explicit error estimates for nonlinear thermo-electric coupling in composites.

Findings

High accuracy in multiscale simulations

Reduced computational cost compared to existing methods

Effective convergence and error control

Abstract

This paper proposes a higher-order multiscale computational method for nonlinear thermo-electric coupling problems of composite structures, which possess temperature-dependent material properties and nonlinear Joule heating. The innovative contributions of this work are the novel multiscale formulation with the higher-order correction terms for periodic composite structures and the global error estimation with an explicit rate for higher-order multiscale solutions. By employing the multiscale asymptotic approach and the Taylor series technique, the higher-order multiscale method is established for time-dependent nonlinear thermo-electric coupling problems, which can keep the local balance of heat flux and electric charge for high-accuracy multiscale simulation. Furthermore, an efficient numerical algorithm with off-line and on-line stages is presented in detail, and corresponding convergent analysis is also obtained. Two- and three-dimensional numerical experiments are conducted to showcase the competitive advantages of the proposed method for simulating the time-dependent nonlinear thermo-electric coupling problems in composite structures, not only exceptional numerical accuracy, but also less computational cost.