Based on some ideas of Greene and Krantz, we study the semicontinuity of
automorphism groups of domains in one and several complex variables. We show
that semicontinuity fails for domains in \CC^n, n>1, with Lipschitz
boundary, but it holds for domains in \CC^1 with Lipschitz boundary. Using
the same ideas, we develop some other concepts related to mappings of Lipschitz
domains. These include Bergman curvature, stability properties for the Bergman
kernel, and also some ideas about equivariant embeddings