Unconditionally Stable Pressure-Correction Schemes for a Nonlinear Fluid-Structure Interaction Model
Ying He, Jie Shen
Communications on Applied Mathematics and Computation ›› 2019, Vol. 1 ›› Issue (1) : 61-80.
Unconditionally Stable Pressure-Correction Schemes for a Nonlinear Fluid-Structure Interaction Model
We consider in this paper numerical approximation of a nonlinear fluid-structure interaction (FSI) model with a fixed interface. We construct a new class of pressure-correction schemes for the FSI problem, and prove rigorously that they are unconditionally stable. These schemes are computationally very efficient, as they lead to, at each time step, a coupled linear elliptic system for the velocity and displacement in the whole region and a discrete Poisson equation in the fluid region.
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