Litcius/Paper detail

Quasi‐Newton waveform iteration for partitioned surface‐coupled multiphysics applications

Benjamin Rüth, Benjamin Uekermann, Miriam Mehl, Philipp Birken, Azahar Monge, Hans‐Joachim Bungartz

2020International Journal for Numerical Methods in Engineering23 citationsDOIOpen Access PDF

Abstract

Summary We present novel coupling schemes for partitioned multiphysics simulation that combine four important aspects for strongly coupled problems: implicit coupling per time step, fast and robust acceleration of the corresponding iterative coupling, support for multirate time stepping, and higher‐order convergence in time. To achieve this, we combine waveform relaxation—a known method to achieve higher‐order in applications with split time stepping based on continuous representations of coupling variables in time— with interface quasi‐Newton coupling, which has been developed throughout the last decade and is generally accepted as a very robust iterative coupling method even for gluing together black‐box simulation codes. We show convergence results (in terms of convergence of the iterative solver and in terms of approximation order in time) for two academic testcases—a heat transfer scenario and a fluid‐structure interaction simulation. We show that we achieve the expected approximation order and that our iterative method is competitive in terms of iteration counts with those designed for simpler first‐order‐in‐time coupling.

Topics & Concepts

MultiphysicsSolverConvergence (economics)Coupling (piping)Iterative methodAccelerationComputer scienceWaveformApplied mathematicsAlgorithmMathematical optimizationTime steppingMathematicsRate of convergenceRobustness (evolution)Interface (matter)Advanced Numerical Methods in Computational MathematicsNumerical methods for differential equationsMatrix Theory and Algorithms
Quasi‐Newton waveform iteration for partitioned surface‐coupled multiphysics applications | Litcius