Localization Coefficients of Functions with Applications in Partial Differential Equations
Abstract
We identify shortcomings in two popular measures of localization of functions: the Lp-Lq participation ratio and the mass concentration comparison. We then introduce a novel localization measure for functions on bounded subsets of Rd, d=1,2,3,…, based on a Wasserstein metric. For efficient computation, we prove the equality of this measure with a suitable Sobolev norm in dimension one. We demonstrate our approach by numerical experiments in one and two dimensions. Finally, we discuss and mitigate challenges arising from boundary effects.
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