Harmonic measure, equilibrium measure, and thinness at infinity in the theory of Riesz potentials

Abstract

Focusing first on the inner α-harmonic measure yA (y being the unit Dirac measure, and μA the inner α-Riesz balayage of a Radon measure μ to A⊂ Rn arbitrary), we describe its Euclidean support, provide a formula for evaluation of its total mass, establish the vague continuity of the map yyA outside the inner α-irregular points for A, and obtain necessary and sufficient conditions for yA to be of finite energy (more generally, for yA to be absolutely continuous with respect to inner capacity) as well as for yA( Rn)1 to hold. Those criteria are given in terms of the newly defined concepts of α-thinness and α-ultrathinness at infinity that generalize the concepts of thinness at infinity by Doob and Brelot, respectively. Further, we extend some of these results to μA general by verifying the formula μA=∫yA\,dμ(y). We also show that there is a Kσ-set A0⊂ A such that μA=μA0 for all μ, and give various applications of this theorem. In particular, we prove the vague and strong continuity of the inner swept, resp. equilibrium, measure under the approximation of A arbitrary, thereby strengthening Fuglede's result established for A Borel (Acta Math., 1960). Being new even for α=2, the results obtained also present a further development of the theory of inner Newtonian capacities and of inner Newtonian balayage, originated by Cartan.