Reproducing Kernel Hilbert Spaces and entropy Kolmogorov numbers on compact Lie Groups
Abstract
On a compact Lie group G, we consider the reproducing kernel Hilbert space HK associated with the integral kernel K of a left-invariant, positive, symmetric, trace class integral operator on L2(G). We present lower and upper asymptotic estimates for the entropy Kolmogorov numbers (also called covering numbers) for the embedding of HK into the space C(G) of continuous functions on G.
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