Logarithmic potential theory and large deviation

Abstract

We derive a general large deviation principle for a canonical sequence of probability measures, having its origins in random matrix theory, on unbounded sets K of C with weakly admissible external fields Q and very general measures on K. For this we use logarithmic potential theory in Rn, n≥ 2, and a standard contraction principle in large deviation theory which we apply from the two-dimensional sphere in R3 to the complex plane C.