Distributed Lagrange Multiplier-Fictitious Domain Finite Element Method for Stokes Interface Problems

Authors

Andrew Lundberg Department of Mathematical Sciences, University of Nevada, Las Vegas, 4505 Maryland Parkway, Las Vegas, Nevada 89154, USA
Pengtao Sun Department of Mathematical Sciences, University of Nevada, Las Vegas, 4505 Maryland Parkway, Las Vegas, Nevada 89154, USA
Cheng Wang School of Mathematical Sciences, Tongji University, Shanghai 200092, China

Keywords:

Stokes interface problems, jump coefficients, distributed Lagrange multiplier, fictitious domain method, mixed finite element, well-posedness, error estimates.

Abstract

In this paper, the distributed Lagrange multiplier-fictitious domain (DLM/FD) finite element method is studied for a type of steady state Stokes interface problems with jump coefficients, and its well-posedness, stability and optimal convergence properties are analyzed by proving an $inf$-$sup$ condition for a nested saddle-point problem that is induced by both Stokes equations and DLM/FD method in regard to Stokes variables (velocity and pressure) and Lagrange multipliers. Numerical experiments validate the obtained convergence theorem of DLM/FD finite element method for Stokes interface problems with respect to different jump ratios.

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Published

2019-08-09

Issue

Vol. 16 No. 6 (2019)

Section

Articles