Robust near-diagonal Green function estimates
Abstract
We prove sharp near-diagonal pointwise bounds for the Green function G(x,y) for nonlocal operators of fractional order α ∈ (0,2). The novelty of our results is two-fold: the estimates are robust as α 2- and we prove the bounds without making use of the Dirichlet heat kernel p(t;x,y). In this way we can cover cases, in which the Green function satisfies isotropic bounds but the heat kernel does not.
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