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Weighted Laplacians on locally doubling manifolds (3E022319)
A measure on a metric space is said to be doubling if the measure of any ball, of whatever size, is comparable to the measure of the ball of same center and half radius. This is one of the fundamental properties of the Lebesgue measure. If a measure is do
Date:1 Nov 2019 → 31 Oct 2022
Keywords:Schrödinger operators., Locally doubling manifolds, function spaces, Lie groups, singular integrals, weighted Laplacians