Michael Damron, Jack Hanson, Philippe Sosoe
Published 2013-06-05, updated 2014-10-23Version 2
We prove that the variance of the passage time from the origin to a point x in first-passage percolation on Z^d is sublinear in the distance to x when d \geq 2, obeying the bound Cx/(log x), under minimal assumptions on the edge-weight distribution. The proof applies equally to absolutely continuous, discrete and singular continuous distributions and mixtures thereof, and requires only 2+log moments. The main result extends work of Benjamini-Kalai-Schramm and Benaim-Rossignol.
Comments: 32 pages. We added a proof sketch and fixed the proof of Theorem 2.3 and the bound on term (6.18)
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