The paper starts by introducing the concept of matrix weighted Lebesgue spaces, where a matrix weight W is a Hermitian and positive definite matrix-valued mapping. It discusses the boundedness of Calderón-Zygmund operators on these spaces, which is characterized by the matrix Muckenhoupt condition.
The paper then proposes the notion of Fn-directional Banach function spaces, which generalize matrix weighted Lebesgue spaces. These spaces are defined as complete normed subspaces of L0(Rd; Fn) that satisfy the directional ideal property and non-degeneracy. The paper shows that these spaces can be naturally extended to spaces of convex-set valued mappings.
The main results of the paper are:
An extrapolation theorem for Fn-directional Banach function spaces, generalizing the result of Bownik and Cruz-Uribe for matrix weighted Lebesgue spaces.
A convex body domination result for the convex-set valued maximal operator MK, which is used to improve the bounds for Calderón-Zygmund operators in Fn-directional Banach function spaces.
A characterization of the Muckenhoupt condition in Fn-directional Banach function spaces in terms of the boundedness of averaging operators related to the convex-set valued maximal operator.
The paper also discusses the relationship between the boundedness of the convex-set valued maximal operator and the Muckenhoupt condition, proving that they are equivalent under certain conditions.
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