An interpolation result for A1 weights with applications to fractional Poincar\'e inequalities
Abstract
We characterize the real interpolation space between weighted L1 and W1,1 spaces on arbitrary domains different from Rn, when the weights are positive powers of the distance to the boundary multiplied by an A1 weight. As an application of this result we obtain weighted fractional Poincar\'e inequalities with sharp dependence on the fractional parameter s (for s close to 1) and show that they are equivalent to a weighted Poincar\'e inequality for the gradient.
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