Asymptotics of the p-capacity in the critical regime

Abstract

In this note, we are interested in the asymptotics as n∞ of the p-capacity between the origin and the set nB, where B is the boundary of the unit ball of the lattice Zd. The p-capacity is defined as the minimum of the Dirichlet energy 12Σx∈ Zd Σy x |f(x)-f(y)|p with f subject to the boundary conditions f(0)=0 and f≥ 1 on nB. This variational problem has arisen in particular in the study of large deviations for first passage percolation. For p<d, the p-capacity converges to some positive constant, while for p>d the capacity vanishes polynomially fast. The present paper deals with the case p=d, for which we prove that the p-capacity vanishes as cd ( n)-d+1 with an explicit constant cd.

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