Low-rank approximation of continuous functions in Sobolev spaces with dominating mixed smoothness

Abstract

Let i⊂Rni, i=1,…,m, be given domains. In this article, we study the low-rank approximation with respect to L2(1×…×m) of functions from Sobolev spaces with dominating mixed smoothness. To this end, we first estimate the rank of a bivariate approximation, i.e., the rank of the continuous singular value decomposition. In comparison to the case of functions from Sobolev spaces with isotropic smoothness, compare GH14,GH19, we obtain improved results due to the additional mixed smoothness. This convergence result is then used to study the tensor train decomposition as a method to construct multivariate low-rank approximations of functions from Sobolev spaces with dominating mixed smoothness. We show that this approach is able to beat the curse of dimension.