On the sharpness of embeddings of H\"older spaces into Gaussian Besov spaces

Abstract

For an interpolation pair (E0,E1) of Banach spaces with E1 E0 we use vectors b1,b2,… ∈ E1 that satisfy an extremal property with respect to the J- and K-functional to construct sub-spaces that are isometric to q(θ). The construction is based on a randomisation using independent Rademacher variables. We verify that systems obtained by re-scaling a function with a certain periodicity property share this extreme property. This implies the sharpness of natural embeddings of H\"older spaces obtained by the real interpolation into the corresponding Gaussian Besov spaces.