Some properties of block-radial functions and Schr\"odinger type operators with block-radial potentials

Abstract

Let Rγ Bsp,q() be a subspace of the Besov space Bsp,q() that consists of block-radial functions. We prove that the asymptotic behaviour of the entropy numbers of compact embeddings : \: Rγ Bs1p1,q1(d) → Rγ Bs2p2,q2(d) depends on the number of blocks of the lowest dimension, the parameters p1 and p2, but is independent of the smoothness parameters s1, s2. We apply the asymptotic behaviour to estimation of powers of a negative spectra of Schr\"odinger type operators with block-radial potentials. This part essentially relies on the Birman-Schwinger principle.