Optimal Hardy weights on the Euclidean lattice

Abstract

We investigate the large-distance asymptotics of optimal Hardy weights on Zd, d≥ 3, via the super solution construction. For the free discrete Laplacian, the Hardy weight asymptotic is the familiar (d-2)24|x|-2 as |x|∞. We prove that the inverse-square behavior of the optimal Hardy weight is robust for general elliptic coefficients on Zd: (1) averages over large sectors have inverse-square scaling, (2), for ergodic coefficients, there is a pointwise inverse-square upper bound on moments, and (3), for i.i.d.\ coefficients, there is a matching inverse-square lower bound on moments. The results imply |x|-4-scaling for Rellich weights on Zd. Analogous results are also new in the continuum setting. The proofs leverage Green's function estimates rooted in homogenization theory.