Litcius/Paper detail

Kernel‐based active subspaces with application to computational fluid dynamics parametric problems using the discontinuous Galerkin method

Francesco Romor, Marco Tezzele, Andrea Lario, Gianluigi Rozza

2022International Journal for Numerical Methods in Engineering18 citationsDOIOpen Access PDF

Abstract

Nonlinear extensions to the active subspaces method have brought remarkable results for dimension reduction in the parameter space and response surface design. We further develop a kernel-based nonlinear method. In particular, we introduce it in a broader mathematical framework that contemplates also the reduction in parameter space of multivariate objective functions. The implementation is thoroughly discussed and tested on more challenging benchmarks than the ones already present in the literature, for which dimension reduction with active subspaces produces already good results. Finally, we show a whole pipeline for the design of response surfaces with the new methodology in the context of a parametric computational fluid dynamics application solved with the discontinuous Galerkin method.

Topics & Concepts

Linear subspaceGalerkin methodContext (archaeology)Parametric statisticsNonlinear systemKernel (algebra)Reduction (mathematics)Dimensionality reductionDimension (graph theory)Pipeline (software)MathematicsMathematical optimizationApplied mathematicsComputer scienceArtificial intelligenceGeometryPure mathematicsQuantum mechanicsProgramming languageBiologyPaleontologyStatisticsCombinatoricsPhysicsModel Reduction and Neural NetworksProbabilistic and Robust Engineering DesignNumerical methods in engineering
Kernel‐based active subspaces with application to computational fluid dynamics parametric problems using the discontinuous Galerkin method | Litcius