Inequalities between mixed volumes of convex bodies: volume bounds for the Minkowski sum
Abstract
In the course of classifying generic sparse polynomial systems which are solvable in radicals, Esterov recently showed that the volume of the Minkowski sum $P_1+\dots+P_d$ of $d$-dimensional lattice polytopes is bounded from above by a function of order $O(m^{2^d})$, where $m$ is the mixed volume of the tuple $(P_1,\dots,P_d)$. This is a consequence of the well-known Aleksandrov-Fenchel inequality. Esterov also posed the problem of determining a sharper bound. We show how additional relations between mixed volumes can be employed to improve the bound to $O(m^d)$, which is asymptotically sharp. We furthermore prove a sharp exact upper bound in dimensions 2 and 3. Our results generalize to tuples of arbitrary convex bodies with volume at least one.
- Publication:
-
arXiv e-prints
- Pub Date:
- February 2020
- DOI:
- 10.48550/arXiv.2002.03065
- arXiv:
- arXiv:2002.03065
- Bibcode:
- 2020arXiv200203065A
- Keywords:
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- Mathematics - Metric Geometry;
- Mathematics - Algebraic Geometry;
- 14M25;
- 52A39;
- 52A40;
- 52B20
- E-Print:
- 21 pages, 5 figures