The minimum area convex lattice $n$-gon

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Department of Mathematics,
University of California San Diego

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Colloquium

Imre Barany

University College London and Mathematical Institute of the Hungarian Academy of Sciences

Abstract:

Let $A(n)$ be the minimum area of convex lattice $n$-gons. (Here lattice is the usual lattice of integer points in $R^2$.) G. E. Andrews proved in 1963 that $A(n)>cn^3$ for a suitable positive $c$. We show here that $\\lim A(n)/n^3$ exists, and explain what the shape of the minimizing convex lattice $n$-gon is. This is joint work with Norihide Tokushige.

Department of Mathematics,
University of California San Diego

Colloquium

Imre Barany

University College London and Mathematical Institute of the Hungarian Academy of Sciences

The minimum area convex lattice $n$-gon

Abstract:

October 27, 2003

3:00 PM

AP&M 7321

Department of Mathematics, University of California San Diego

Colloquium

Imre Barany

University College London and Mathematical Institute of the Hungarian Academy of Sciences

The minimum area convex lattice $n$-gon

Abstract:

October 27, 2003

3:00 PM

AP&M 7321

Department of Mathematics,
University of California San Diego