Universality for conformally invariant intersection exponents

Abstract

We construct a class of conformally invariant measures on sets (orpaths) and we study the critical exponents called intersection exponentsassociated to these measures. we show that these exponents exist andthat they correspond to intersection exponents between planar Brownianmotions. More precisely, using the definitions and results of our paper [27],we show that any set defined under such a conformal invariant measurebehaves exactly as a pack (containing maybe a non-integer number) of...