%0 Journal Article %J Computer & Mathematics With Applications %D 2021 %T A Reduced Order Cut Finite Element method for geometrically parametrized steady and unsteady Navier–Stokes problems %A Efthymios N Karatzas %A Monica Nonino %A F. Ballarin %A Gianluigi Rozza %K Cut Finite Element Method %K Navier–Stokes equations %K Parameter–dependent shape geometry %K Reduced Order Models %K Unfitted mesh %X

We focus on steady and unsteady Navier–Stokes flow systems in a reduced-order modeling framework based on Proper Orthogonal Decomposition within a levelset geometry description and discretized by an unfitted mesh Finite Element Method. This work extends the approaches of [1], [2], [3] to nonlinear CutFEM discretization. We construct and investigate a unified and geometry independent reduced basis which overcomes many barriers and complications of the past, that may occur whenever geometrical morphings are taking place. By employing a geometry independent reduced basis, we are able to avoid remeshing and transformation to reference configurations, and we are able to handle complex geometries. This combination of a fixed background mesh in a fixed extended background geometry with reduced order techniques appears beneficial and advantageous in many industrial and engineering applications, which could not be resolved efficiently in the past.

%B Computer & Mathematics With Applications %8 2021/08/12/ %@ 0898-1221 %G eng %U https://www.sciencedirect.com/science/article/pii/S0898122121002790 %! Computers & Mathematics with Applications