High-dimensional nonlinear approximation by parametric manifolds in H\"older-Nikol'skii spaces of mixed smoothness

Abstract

We study high-dimensional nonlinear approximation of functions in H\"older-Nikol'skii spaces Hα∞(Id) on the unit cube Id:=[0,1]d having mixed smoothness, by parametric manifolds. The approximation error is measured in the L∞-norm. In this context, we explicitly constructed methods of nonlinear approximation, and give dimension-dependent estimates of the approximation error explicitly in dimension d and number N measuring computation complexity of the parametric manifold of approximants. For d=2, we derived a novel right asymptotic order of noncontinuous manifold N-widths of the unit ball of Hα∞(I2) in the space L∞(I2). In constructing approximation methods, the function decomposition by the tensor product Faber series and special representations of its truncations on sparse grids play a central role.