Hirschler, T.Antolin, P.Buffa, A.2021-11-202021-11-202021-11-20202210.1007/s00466-021-02098-yhttps://infoscience.epfl.ch/handle/20.500.14299/183086WOS:000712943600001The matrix formation associated to high-order discretizations is known to be numerically demanding. Based on the existing procedure of interpolation and lookup, we design a multiscale assembly procedure to reduce the exorbitant assembly time in the context of isogeometric linear elasticity of complex microstructured geometries modeled via spline compositions. The developed isogeometric approach involves a polynomial approximation occurring at the macro-scale and the use of lookup tables with pre-computed integrals incorporating the micro-scale information. We provide theoretical insights and numerical examples to investigate the performance of the procedure. The strategy turns out to be of great interest not only to form finite element operators but also to compute other quantities in a fast manner as for instance sensitivity analyses commonly used in design optimization.Mathematics, Interdisciplinary ApplicationsMechanicsMathematicsmultiscale mechanicsmatrix assemblyisogeometric analysisadditive manufacturinggeometric modelinglattice structuresfinite-element-methodshape optimizationoptimal quadraturespline spacesdecompositiondesignnurbshomogenizationapproximationshelltext::journal::journal article::research article