Estimates for Nonlinear Harmonic Measures on Trees
Abstract
In this paper we give some estimates for nonlinear harmonic measures on trees. In particular, we estimate in terms of the size of a set D the value at the origin of the solution to u(x)=F((x,0),…,(x,m-1)) for every x∈Tm, a directed tree with m branches with initial datum f+D. Here F is an averaging operator on Rm, x is a vertex of a directed tree Tm with regular m-branching and (x,i) denotes a successor of that vertex for 0 i m-1.
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