On the mth order p-affine capacity

Abstract

Let Mn, m(R) denote the space of n× m real matrices, and Kon,m be the set of convex bodies in Mn, m(R) containing the origin. We develop a theory for the mth order p-affine capacity Cp,Q(·) for p∈[1,n) and Q∈Ko1,m. Several equivalent definitions for the mth order p-affine capacity will be provided, and some of its fundamental properties will be proved, including for example, translation invariance and affine invariance. We also establish several inequalities related to the mth order p-affine capacity, including those comparing to the p-variational capacity, the volume, the mth order p-integral affine surface area, as well as the Lp surface area.