This is an announcement for the paper "Bezout Inequality for Mixed volumes" by Ivan Soprunov and Artem Zvavitch.
Abstract: In this paper we consider the following analog of Bezout inequality for mixed volumes: $$V(P_1,\dots,P_r,\Delta^{n-r})V_n(\Delta)^{r-1}\leq \prod_{i=1}^r V(P_i,\Delta^{n-1})\ \text{ for }2\leq r\leq n.$$ We show that the above inequality is true when $\Delta$ is an $n$-dimensional simplex and $P_1, \dots, P_r$ are convex bodies in $\mathbb{R}^n$. We conjecture that if the above inequality is true for all convex bodies $P_1, \dots, P_r$, then $\Delta$ must be an $n$-dimensional simplex. We prove that if the above inequality is true for all convex bodies $P_1, \dots, P_r$, then $\Delta$ must be indecomposable (i.e. cannot be written as the Minkowski sum of two convex bodies which are not homothetic to $\Delta$), which confirms the conjecture when $\Delta$ is a simple polytope and in the 2-dimensional case. Finally, we connect the inequality to an inequality on the volume of orthogonal projections of convex bodies as well as prove an isomorphic version of the inequality.
Archive classification: math.MG math.FA
Mathematics Subject Classification: Primary 52A39, 52B11, 52A20, Secondary 52A23
Remarks: 18 pages, 2 figures
Submitted from: i.soprunov@csuohio.edu
The paper may be downloaded from the archive by web browser from URL
http://front.math.ucdavis.edu/1507.00765
or