An Almgren monotonicity formula for discrete harmonic functions

Abstract

The celebrated Almgren monotonicity formula for harmonic functions u:Rn → R says that its L2-energy concentrated on a sphere of radius r, when measured in a suitable sense, is non-decreasing: if u oscillates at a certain scale, it has even larger oscillations at a larger scale. We prove a discrete analogue of the Almgren monotonicity formula for harmonic functions on infinite combinatorial graphs G=(V,E). Some applications are discussed.

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