Tensor-Train WENO Scheme for Compressible Flows

TL;DR

This paper introduces a tensor-train based WENO scheme for compressible flows that achieves high accuracy, reduces computational cost, and manages tensor ranks effectively, representing a novel approach in CFD numerical methods.

Contribution

It develops the first finite difference WENO scheme using tensor-train format for compressible Euler equations, with innovative rank management and acceleration techniques.

Findings

Achieves 5th-order accuracy in smooth regions.

Accelerates traditional WENO up to 1000 times in TT format.

Reduces memory requirements for low-rank problems.

Abstract

In this study, we introduce a tensor-train (TT) finite difference WENO method for solving compressible Euler equations. In a step-by-step manner, the tensorization of the governing equations is demonstrated. We also introduce \emph{LF-cross} and \emph{WENO-cross} methods to compute numerical fluxes and the WENO reconstruction using the cross interpolation technique. A tensor-train approach is developed for boundary condition types commonly encountered in Computational Fluid Dynamics (CFD). The performance of the proposed WENO-TT solver is investigated in a rich set of numerical experiments. We demonstrate that the WENO-TT method achieves the theoretical $\text{5}^{\text{th}}$-order accuracy of the classical WENO scheme in smooth problems while successfully capturing complicated shock structures. In an effort to avoid the growth of TT ranks, we propose a dynamic method to estimate the TT approximation error that governs the ranks and overall truncation error of the WENO-TT scheme. Finally, we show that the traditional WENO scheme can be accelerated up to 1000 times in the TT format, and the memory requirements can be significantly decreased for low-rank problems, demonstrating the potential of tensor-train approach for future CFD application. This paper is the first study that develops a finite difference WENO scheme using the tensor-train approach for compressible flows. It is also the first comprehensive work that provides a detailed perspective into the relationship between rank, truncation error, and the TT approximation error for compressible WENO solvers.