Bounds for Lattice Polytopes Containing a Fixed Number of Interior Points in a Sublattice

Jeffrey C. Lagarias; Günter M. Ziegler

doi:10.4153/CJM-1991-058-4

Abstract

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A lattice polytope is a polytope in whose vertices are all in . The volume of a lattice polytope P containing exactly k ≥ 1 points in d in its interior is bounded above by . Any lattice polytope in of volume V can after an integral unimodular transformation be contained in a lattice cube having side length at most n˙n ! V. Thus the number of equivalence classes under integer unimodular transformations of lattice poly topes of bounded volume is finite. If S is any simplex of maximum volume inside a closed bounded convex body K in having nonempty interior, then K⊆ ( n + 2)S — (n+ l)s where mS denotes a nomothetic copy of S with scale factor m, and s is the centroid of S.

References

1. Andrews, G.E., A lower bound for the volume of strictly convex bodies with many boundary lattice points, Trans. Amer. Math. Soc. 106 (1963), 270–279.Google Scholar

2. Blichfeldt, H., A new principle in the geometry of numbers, with some applications, Trans. Amer. Math. Soc. 15 (1914), 227–235.Google Scholar

3. Cassels, J.W.S., An introduction to the geometry of numbers. Grundlehren Series 99, Springer-Verlag, 1971.Google Scholar

4. Gruber, P.M. and Lekkerkerker, C.G., Geometry of numbers. 2nd éd., North-Holland, Amsterdam, 1987.Google Scholar

5. Hensley, D., Lattice vertex poly topes with interior lattice points, Pacific J. Math. 105 (1983), 183–191.Google Scholar

6. Mahler, K., The geometry of numbers. Duplicated lecture notes, University of Colorado, 1950.Google Scholar

7. Rado, R., Some covering theorems (I), Proc. London Math. Soc. 51 (1949), 232–264.Google Scholar

8. Reznick, B., Lattice point simplices, Discrete Math. 60 (1986), 219–242.Google Scholar

9. Scott, R.P., On convex lattice polygons, Bull. Austral. Math. Soc. 15 (1976), 395–399.Google Scholar

10. Zaks, J., Perles, A. and Wills, J.M., On lattice polytopes having interior lattice points, Elemente der Math.Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Davison, J. L. and Shallit, J. O. 1991. Continued fractions for some alternating series. Monatshefte f�r Mathematik, Vol. 111, Issue. 2, p. 119.

GRITZMANN, Peter and WILLS, Jörg M. 1993. Handbook of Convex Geometry. p. 765.

Poonen, Bjorn and Rodriguez-Villegas, Fernando 2000. Lattice Polygons and the Number 12. The American Mathematical Monthly, Vol. 107, Issue. 3, p. 238.

Pikhurko, Oleg 2001. Lattice points in lattice polytopes. Mathematika, Vol. 48, Issue. 1-2, p. 15.

Debarre, Olivier 2003. Higher Dimensional Varieties and Rational Points. Vol. 12, Issue. , p. 93.

Darte, A. Schreiber, R. and Villard, G. 2005. Lattice-Based Memory Allocation. IEEE Transactions on Computers, Vol. 54, Issue. 10, p. 1242.

Nill, Benjamin 2005. Gorenstein toric Fano varieties. manuscripta mathematica, Vol. 116, Issue. 2, p. 183.

Böröczky, Károly 2005. The stability of the Rogers–Shephard inequality and of some related inequalities. Advances in Mathematics, Vol. 190, Issue. 1, p. 47.

Henk, Martin Schürmann, Achill and Wills, Jörg M. 2005. Ehrhart Polynomials and Successive Minima. Mathematika, Vol. 52, Issue. 1-2, p. 1.

Nill, Benjamin 2008. Lattice polytopes having h∗-polynomials with given degree and linear coefficient. European Journal of Combinatorics, Vol. 29, Issue. 7, p. 1596.

Haase, Christian Nill, Benjamin and Payne, Sam 2009. Cayley decompositions of lattice polytopes and upper bounds for h*-polynomials. Journal für die reine und angewandte Mathematik (Crelles Journal), Vol. 2009, Issue. 637,

Haase, Christian and Schicho, Josef 2009. Lattice Polygons and the Number 2i + 7. The American Mathematical Monthly, Vol. 116, Issue. 2, p. 151.

Kasprzyk, Alexander M. Kreuzer, Maximilian and Nill, Benjamin 2010. On the combinatorial classification of toric log del Pezzo surfaces. LMS Journal of Computation and Mathematics, Vol. 13, Issue. , p. 33.

Treutlein, Jaron 2010. Lattice polytopes of degree 2. Journal of Combinatorial Theory, Series A, Vol. 117, Issue. 3, p. 354.

LAGARIAS, JEFFREY C. 2010. CYCLIC SYSTEMS OF SIMULTANEOUS CONGRUENCES. International Journal of Number Theory, Vol. 06, Issue. 02, p. 219.

Beck, Matthias and Stapledon, Alan 2010. On the log-concavity of Hilbert series of Veronese subrings and Ehrhart series. Mathematische Zeitschrift, Vol. 264, Issue. 1, p. 195.

Maydanskiy, Maksim and Mirabelli, Benjamin P. 2011. Semisimplicity of the quantum cohomology for smooth Fano toric varieties associated with facet symmetric polytopes. Electronic Research Announcements in Mathematical Sciences, Vol. 18, Issue. 0, p. 131.

Nill, Benjamin and Ziegler, Günter M. 2011. Projecting Lattice Polytopes Without Interior Lattice Points. Mathematics of Operations Research, Vol. 36, Issue. 3, p. 462.

Liu, Heling and Zong, Chuanming 2011. On the classification of convex lattice polytopes. advg, Vol. 11, Issue. 4, p. 711.

Averkov, Gennadiy Wagner, Christian and Weismantel, Robert 2011. Maximal Lattice-Free Polyhedra: Finiteness and an Explicit Description in Dimension Three. Mathematics of Operations Research, Vol. 36, Issue. 4, p. 721.

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Bounds for Lattice Polytopes Containing a Fixed Number of Interior Points in a Sublattice

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References

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Article contents

Bounds for Lattice Polytopes Containing a Fixed Number of Interior Points in a Sublattice

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References

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