Moment bounds on correctors for the degenerate random conductance model
Abstract
We study the random conductance model on the lattice d, i.e. we consider a linear, finite-difference, divergence-form operator with random conductances a. We allow the conductances a to be unbounded and degenerate. Assuming the conductances satisfy a spectral-gap inequality, we establish sharp bounds on the spatial growth of correctors, together with a quantitative relation between the stochastic integrability of the correctors and that of a.
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