Efficient multivariate approximation on the cube

Abstract

We combine a periodization strategy for weighted L2-integrands with efficient approximation methods in order to approximate multivariate non-periodic functions on the high-dimensional cube [-12,12]d. Our concept allows to determine conditions on the d-variate torus-to-cube transformations :[-12,12]d[-12,12]d such that a non-periodic function is transformed into a smooth function in the Sobolev space Hm(Td) when applying . We adapt some L∞(Td)- and L2(Td)-approximation error estimates for single rank-1 lattice approximation methods and adjust algorithms for the fast evaluation and fast reconstruction of multivariate trigonometric polynomials on the torus in order to apply these methods to the non-periodic setting. We illustrate the theoretical findings by means of numerical tests in up to d=5 dimensions.