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Efficient Approximation of Flow Problems With Multiple Scales in Time

Stefan Frei, Thomas Richter

2020Multiscale Modeling and Simulation17 citationsDOIOpen Access PDF

Abstract

In this article we address flow problems that carry a multiscale character in time. In particular we consider the Navier--Stokes flow in a channel on a fast scale that influences the movement of the boundary which undergoes a deformation on a slow scale in time. We derive an averaging scheme that is of first order with respect to the ratio of time scales $\epsilon$. In order to cope with the problem of unknown initial data for the fast-scale problem, we assume near-periodicity in time. Moreover, we construct a second-order accurate time discretization scheme and derive a complete error analysis for a corresponding simplified ODE system. The resulting multiscale scheme does not ask for the continuous simulation of the fast-scale variable and shows powerful speedups up to 1:10,000 compared to a resolved simulation. Finally, we present some numerical examples for the full Navier--Stokes system to illustrate the convergence and performance of the approach.

Topics & Concepts

DiscretizationOdeFlow (mathematics)Scale (ratio)Convergence (economics)Applied mathematicsMathematicsScheme (mathematics)Time steppingVariable (mathematics)Mathematical optimizationComputer scienceMathematical analysisGeometryPhysicsEconomic growthQuantum mechanicsEconomicsAdvanced Mathematical Modeling in EngineeringAdvanced Numerical Methods in Computational MathematicsComposite Material Mechanics