A Rogers--Brascamp--Lieb--Luttinger inequality in the space of matrices
Abstract
We consider convex bodies in Mn,m( R), the space of matrices of n-rows and m-columns. A special case of fiber-symmetrization in Mn,m( R) was recently introduced in [5,6]. We prove a Rogers--Brascamp--Lieb--Luttinger type inequality with respect to this symmetrization, for quasi-concave functions and provide some applications.
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