A short note on compact embeddings of reproducing kernel Hilbert spaces in L2 for infinite-variate function approximation

Abstract

This note consists of two largely independent parts. In the first part we give conditions on the kernel k: × → R of a reproducing kernel Hilbert space H continuously embedded via the identity mapping into L2(, μ), which are equivalent to the fact that H is even compactly embedded into L2(, μ). In the second part we consider a scenario from infinite-variate L2-approximation. Suppose that the embedding of a reproducing kernel Hilbert space of univariate functions with reproducing kernel 1+k into L2(, μ) is compact. We provide a simple criterion for checking compactness of the embedding of a reproducing kernel Hilbert space with the kernel given by Σu ∈ U γu j ∈ uk, where U = \u ⊂ N: |u| < ∞\, and (γu)u ∈ U is a sequence of non-negative numbers, into an appropriate L2 space.