Lp geominimal surface areas and their inequalities

Abstract

In this paper, we introduce the Lp geominimal surface area for all -n≠ p<1, which extends the classical geominimal surface area (p=1) by Petty and the Lp geominimal surface area by Lutwak (p>1). Our extension of the Lp geominimal surface area is motivated by recent work on the extension of the Lp affine surface area -- a fundamental object in (affine) convex geometry. We prove some properties for the Lp geominimal surface area and its related inequalities, such as, the affine isoperimetric inequality and a Santal\'o style inequality. Cyclic inequalities are established to obtain the monotonicity of the Lp geominimal surface areas. Comparison between the Lp geominimal surface area and the p-surface area is also provided.