On the lower bounds of p-modulus of families of paths and a finite connectedness

Abstract

We study the problem of the lower bounds of the modulus of families of paths of order p, p>n-1, and their connection with the geometry of domains containing the specified families. Among other things, we have proved an analogue of N\"akki's theorem on the positivity of the p-module of families of paths joining a pair of continua in the given domain. The geometry of domains with a strongly accessible boundary in the sense of the p-modulus of families of paths was also studied. We show that domains with a p-strongly accessible boundary with respect to a p-modulus, p>n-1, are are finitely connected at their boundary. The mentioned result generalizes N\"akki's result, which was proved for uniform domains in the case of a conformal modulus.