Variational formula for the time-constant of first-passage percolation

Abstract

We consider first-passage percolation with positive, stationary-ergodic weights on the square lattice Zd. Let T(x) be the first-passage time from the origin to a point x in Zd. The convergence of the scaled first-passage time T([nx])/n to the time-constant as n tends to infinity can be viewed as a problem of homogenization for a discrete Hamilton-Jacobi-Bellman (HJB) equation. By borrowing several tools from the continuum theory of stochastic homogenization for HJB equations, we derive an exact variational formula for the time-constant. We then construct an explicit iteration that produces the minimizer of the variational formula (under a symmetry assumption), thereby computing the time-constant. The variational formula may also be seen as a duality principle, and we discuss some aspects of this duality.