Equicontinuity and normality of mappings with integrally bounded p-moduli

Abstract

We consider the generic discrete open mappings in Rn under which the perturbation of extremal lengths of curve collections is controlled integrally via ∫ Q(x)ηp(|x-x0|) dm(x) with n-1<p<n, where Q is a measurable function on Rn and ∫r1r2 η(r) dr 1 for any η on a given interval [r1,r2]. We proved that the family of all open discrete mappings of above type is normal under appropriate restrictions on the majorant Q.