论文信息 - Lawrence Oriented Matroids and a Problem of McMullen on Projective Equivalences of Polytopes

Lawrence Oriented Matroids and a Problem of McMullen on Projective Equivalences of Polytopes

Consider the following question introduced by McMullen: Determine the largest integern=f(d) such that any set of n points in general position in the affine d -space Rdcan be mapped by a projective transformation onto the vertices of a convex polytope. It is known that 2 d+ 1 ?f(d) < (d+ 1)(d+ 2)/2 and it is conjectured that f(d) = 2 d+ 1. In this paper, we show that f(d) < 2 d+ ?d+1 2 ? by using a well-known oriented matroid generalization of the above problem.

Jorge L. Ramírez Alfonsín

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