On the spectral estimates for Schr\"odinger type operators. The case of small local dimension

Abstract

The behavior of the discrete spectrum of the Schr\"odinger operator - - V, in quite a general setting, up to a large extent is determined by the behavior of the corresponding heat kernel P(t;x,y) as t 0 and t∞. If this behavior is powerlike, i.e., \[\|P(t;·,·)\|L∞=O(t-δ/2),\ t 0; \|P(t;·,·)\|L∞=O(t-D/2),\ t∞,\] then it is natural to call the exponents δ,D " the local dimension" and " the dimension at infinity" respectively. The character of spectral estimates depends on the relation between these dimensions. In the paper we analyze the case where δ<D that was insufficiently studied before. Our applications concern the combinatorial and the metric graphs.