Litcius/Paper detail

Lagrangian–Eulerian multidensity topology optimization with the material point method

Yue Li, Xuan Li, Minchen Li, Yixin Zhu, Bo Zhu, Chenfanfu Jiang

2021International Journal for Numerical Methods in Engineering24 citationsDOIOpen Access PDF

Abstract

Abstract In this paper, a hybrid Lagrangian–Eulerian topology optimization (LETO) method is proposed to solve the elastic force equilibrium with the Material Point Method (MPM). LETO transfers density information from freely movable Lagrangian carrier particles to a fixed set of Eulerian quadrature points. This transfer is based on a smooth radial kernel involved in the compliance objective to avoid the artificial checkerboard pattern. The quadrature points act as MPM particles embedded in a lower‐resolution grid and enable a subcell multidensity resolution of intricate structures with a reduced computational cost. A quadrature‐level connectivity graph‐based method is adopted to avoid the artificial checkerboard issues commonly existing in multiresolution topology optimization methods. Numerical experiments are provided to demonstrate the efficacy of the proposed approach.

Topics & Concepts

Topology optimizationQuadrature (astronomy)Topology (electrical circuits)CheckerboardGridEulerian pathMaterial point methodMathematical optimizationKernel (algebra)MathematicsPoint (geometry)Level set methodComputer scienceHomogenization (climate)Gaussian quadratureApplied mathematicsOptimization problemNyström methodAlgorithmShape optimizationFinite element methodSet (abstract data type)Numerical analysisLagrangianGrid method multiplicationNumerical stabilityTopology Optimization in EngineeringAdvanced Multi-Objective Optimization AlgorithmsComposite Material Mechanics