Abstract The Petty projection inequality is a fundamental affine isoperimetric principle for convex sets. It has shaped several directions of research in the convex geometry which forged new connections between projection bodies, centroid bodies, and mixed volume inequalities. We establish several different empirical forms of the Petty projection inequality by re‐examining these key relationships from a stochastic perspective. In particular, we derive sharp extremal inequalities for several multiple‐entry functionals of random convex sets, including mixed projection bodies and mixed volumes.
Paouris et al. (Sun,) studied this question.