Imre Bárány, Jean-Michel Kantor
Published 1999-05-19Version 1
Given a lattice polytope $P$ (with underlying lattice $\lo$), the universal counting function $\uu_P(\lo')=|P\cap \lo'|$ is defined on all lattices $\lo'$ containing $\lo$. Motivated by questions concerning lattice polytopes and the Ehrhart polynomial, we study the equation $\uu_P=\uu_Q$.
Grassmannians in the Lattice points of Dilations of the Standard Simplex
Higher integrality conditions, volumes and Ehrhart polynomials
On the span of lattice points in a parallelepiped
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