Solvability of elliptic homogeneous linear equations with measure data in weighted Lebesgue spaces
Abstract
Let A(D) be an elliptic homogeneous linear differential operator with complex constant coefficients, μ be a vector-valued Borel measure and w be a positive locally integrable function on RN. In this work, we present sufficient conditions on μ and w for the existence of solutions in the weighted Lebesgue spaces Lpw for the equation A*(D)f=μ, for 1≤ p<∞ . Those conditions are related to a certain control of the Riesz potential of the measure μ. We also present sufficient conditions for the solvability when p=∞ adding a canceling condition on the operator. Our method is based on a new weighted L1 Stein-Weiss type inequality on measures for a special class of vector fields.
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