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Matrix weighted Poincaré inequalities and applications to degenerate elliptic systems

Published 1 Jan 2016 in math.AP and math.CA | (1601.00111v5)

Abstract: We prove Poincar\'e and Sobolev inequalities in matrix A${}p$ weighted spaces. We then use these Poincar\'e inequalities to prove existence and regularity results for degenerate systems of elliptic equations whose degeneracy is governed by a matrix A${}_p$ weight. Such results parallel earlier results by Fabes, Kenig, and Serapioni for a single degenerate equation governed by a scalar A${}_p$ weight. In addition, we prove Cacciopoli and reverse H\"older inequalities for weak solutions of the degenerate systems. As a means to prove the Poincar\'e inequalities we prove that the Riesz potential and fractional maximal function operators are bounded on matrix weighted $Lp$ spaces and go on to develop an entire matrix A${}{p, q}$ theory.

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