\(L_{p}\)-mixed intersection bodies (Q2928368)

\(L_p\)-mixed intersection bodies were defined and investigated in the paper of \textit{C. Zhao} [Sci. China, Ser. A 51, No. 12, 2172--2188 (2008; Zbl 1208.52009)]. In this paper the author defines the concept of \(L_p\)-mixed intersection bodies differently from Zhao, as follows (cf. Definition 1.1 on pp. 560): Let \(K\subset {\mathbb R}^n\) be a star body, and \(p\geq 1\) and \(i\in{\mathbb R}\). Then the radial function of the \(L_p\)-mixed intersection body \(I_{p,i}K\) is the following NEWLINE\[NEWLINE\rho(I_{p,i}K,u)^p=((n-1)\omega_{n-1})^{-1}\int_{S^{n-1}\cap u^\perp} \rho(K,\nu)^{n-p-i}dS_{n-2}(v)NEWLINE\]NEWLINE for \(u\in S^{n-1}\). In the above definition \(\omega_{n-1}\) denotes the volume of the \((n-1)\)-dimensional unit ball and integration is with respect to the surface area measure of \(S^{n-2}\).NEWLINENEWLINEThe author investigates the monotonicity properties of \(L_p\)-intersection bodies (according to the definition given in this paper), and also proves various inequalities about them.