Versatile Mixed Methods for Non-Isothermal Incompressible Flows

TL;DR

This paper extends versatile mixed numerical methods to simulate non-isothermal incompressible flows, including weakly and fully compressible flows, demonstrating their stability and effectiveness through convection problem applications.

Contribution

It introduces modifications to existing mixed methods for non-isothermal flows, broadening their applicability to a wider class of fluid dynamics problems.

Findings

Proved L2-stability of the discrete temperature field.

Successfully applied methods to classical convection problems.

Demonstrated practical effectiveness of the extended methods.

Abstract

The purpose of this paper is to extend the versatile mixed methods originally developed by Chen and Williams for isothermal flows in "Versatile Mixed Methods for the Incompressible Navier-Stokes Equations," Computers & Mathematics with Applications, 2020, (under review), to simulate non-isothermal incompressible flows. These new mixed methods are particularly interesting, as with only minor modifications they can be applied to a much broader range of flows, including non-isothermal weakly-compressible flows, and fully-compressible flows. In the main body of this paper, we carefully develop these mixed methods for solving the Boussinesq model equations. Thereafter, we prove the L2-stability of the discrete temperature field, and assess the practical behavior of the methods by applying them to a set of well-known convection problems.