On the logarithmic equilibrium measure on curves

Abstract

Let μ be the logarithmic equilibrium measure on a compact set γ ⊂ Rd. We prove that μ is absolutely continuous with respect to the length measure on the part of γ which can be locally expressed as the graph of a C1,α-function R Rd - 1, α > 0. For d = 2, at least in the case where γ is a compact C1,α-graph, our result can also be deduced from the classical fact that μ coincides with the harmonic measure of =R2 \, \, γ with pole at ∞. For d ≥ 3, however, our result is new even for C∞-graphs. In fact, up to now it was not even known if the support of μ has positive dimension.