V. Golyshev conjectured that for any smooth polytope P of dimension at most five, the roots $z\in\C$ of the Ehrhart polynomial for P have real part equal to -1/2. An elementary proof is given, and in each dimension the roots are described explicitly. We also present examples which demonstrate that this result cannot be extended to dimension six
A rational polytope is the convex hull of a finite set of points in Rd with rational coordinates. Gi...
AbstractThe Ehrhart polynomial of an integral convex polytope counts the number of lattice points in...
AbstractWe prove that the Ehrhart polynomial of a zonotope is a specialization of the arithmetic Tut...
The symmetric edge polytopes of odd cycles (del Pezzo polytopes) are known as smooth Fano polytopes....
Abstract. Several polytopes arise from finite graphs. For edge and symmetric edge polytopes, in part...
Abstract. The Ehrhart polynomial of a convex lattice polytope counts integer points in integral dila...
We study the connection between stringy Betti numbers of Gorenstein toric varieties and the generati...
In geometric, algebraic, and topological combinatorics, properties such as symmetry, unimodality, an...
The Ehrhart polynomial $ehr_P (n)$ of a lattice polytope $P$ gives the number of integer lattice poi...
A lattice polytope translated by a rational vector is called an almost integral polytope. In this pa...
© 2018 Oxford University Press. All rights reserved. The key object in the Ehrhart theory of lattice...
In this paper, we study the Ehrhart polynomial of the dual of the root polytope of type C of dimensi...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 2006.Includes bibliogr...
We study the equivariant Ehrhart theory of families of polytopes that are invariant under a non-triv...
A rational polytope is the convex hull of a finite set of points in R[superscript d] with rational c...
A rational polytope is the convex hull of a finite set of points in Rd with rational coordinates. Gi...
AbstractThe Ehrhart polynomial of an integral convex polytope counts the number of lattice points in...
AbstractWe prove that the Ehrhart polynomial of a zonotope is a specialization of the arithmetic Tut...
The symmetric edge polytopes of odd cycles (del Pezzo polytopes) are known as smooth Fano polytopes....
Abstract. Several polytopes arise from finite graphs. For edge and symmetric edge polytopes, in part...
Abstract. The Ehrhart polynomial of a convex lattice polytope counts integer points in integral dila...
We study the connection between stringy Betti numbers of Gorenstein toric varieties and the generati...
In geometric, algebraic, and topological combinatorics, properties such as symmetry, unimodality, an...
The Ehrhart polynomial $ehr_P (n)$ of a lattice polytope $P$ gives the number of integer lattice poi...
A lattice polytope translated by a rational vector is called an almost integral polytope. In this pa...
© 2018 Oxford University Press. All rights reserved. The key object in the Ehrhart theory of lattice...
In this paper, we study the Ehrhart polynomial of the dual of the root polytope of type C of dimensi...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 2006.Includes bibliogr...
We study the equivariant Ehrhart theory of families of polytopes that are invariant under a non-triv...
A rational polytope is the convex hull of a finite set of points in R[superscript d] with rational c...
A rational polytope is the convex hull of a finite set of points in Rd with rational coordinates. Gi...
AbstractThe Ehrhart polynomial of an integral convex polytope counts the number of lattice points in...
AbstractWe prove that the Ehrhart polynomial of a zonotope is a specialization of the arithmetic Tut...
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