Tug-of-war with noise and an invariance of p-harmonic functions under boundary perturbations

Abstract

In this paper, we provide new results about an invariance of p-harmonic functions under boundary perturbations by using tug-of-war with noise; a probabilistic interpretation of p-harmonic functions introduced by Peres-Sheffield in ps. As a main result, when E⊂ is countable and f∈ C(), we provide a necessary and sufficient condition for E to guarantee that Hg=Hf whenever g=f on E. Here Hf and Hg denote the Perron solutions of f and g. It turns out that E should be of p-harmonic measure zero with respect to . As a consequence, we analyze a structure of a countable set of p-harmonic measure zero. In particular, we give some results for the subadditivity of p-harmonic measures and an invariance result for p-harmonic measures. In addition, the results in this paper solve the problem regarding a perturbation point Bj\"orn Bjorn suggested for the case of unweighted n.