The annular decay property and capacity estimates for thin annuli

Abstract

We obtain upper and lower bounds for the nonlinear variational capacity of thin annuli in weighted Rn and in metric spaces, primarily under the assumptions of an annular decay property and a Poincar\'e inequality. In particular, if the measure has the 1-annular decay property at x0 and the metric space supports a pointwise 1-Poincar\'e inequality at x0, then the upper and lower bounds are comparable and we get a two-sided estimate for thin annuli centred at x0, which generalizes the known estimate for the usual variational capacity in unweighted Rn. Most of our estimates are sharp, which we show by supplying several key counterexamples. We also characterize the 1-annular decay property.