Abstract
We compare the Kolmogorov and entropy numbers of compact operators mapping from a Hilbert space into a Banach space. These general findings are then applied to embeddings between reproducing kernel Hilbert spaces and L∞(μ). Here a sufficient condition for a gap of the order n1/2 between the associated interpolation and Kolmogorov n-widths is derived. Finally, we show that in the multi-dimensional Sobolev case, this gap actually occurs between the Kolmogorov and approximation widths.
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