On the monotone properties of general affine surface areas under the Steiner symmetrization
Abstract
In this paper, we prove that, if functions (concave) φ and (convex) satisfy certain conditions, the Lφ affine surface area is monotone increasing, while the L affine surface area is monotone decreasing under the Steiner symmetrization. Consequently, we can prove related affine isoperimetric inequalities, under certain conditions on φ and , without assuming that the convex body involved has centroid (or the Santal\'o point) at the origin.
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