The universal relation between scaling exponents in first-passage percolation
arXiv:1105.4566
Abstract
It has been conjectured in numerous physics papers that in ordinary first-passage percolation on integer lattices, the fluctuation exponent $Ï$ and the wandering exponent $ξ$ are related through the universal relation $Ï=2ξ-1$, irrespective of the dimension. This is sometimes called the KPZ relation between the two exponents. This article gives a rigorous proof of this conjecture assuming that the exponents exist in a certain sense.
33 pages, 8 figures. To appear in the Annals of Math