Nonlinear tensor product approximation of functions
Abstract
We are interested in approximation of a multivariate function by linear combinations of products of univariate functions , . In the case it is a classical problem of bilinear approximation. In the case of approximation in the space the bilinear approximation problem is closely related to the problem of singular value decomposition (also called Schmidt expansion) of the corresponding integral operator with the kernel . There are known results on the rate of decay of errors of best bilinear approximation in under different smoothness assumptions on . The problem of multilinear approximation (nonlinear tensor product approximation) in the case is more difficult and much less studied than the bilinear approximation problem. We will present results on best multilinear approximation in under mixed smoothness assumption on .
Cite
@article{arxiv.1409.1403,
title = {Nonlinear tensor product approximation of functions},
author = {D. Bazarkhanov and V. Temlyakov},
journal= {arXiv preprint arXiv:1409.1403},
year = {2014}
}