Beiträge zur Algebra und Geometrie Contributions to Algebra and Geometry Vol. 47, No. 2, pp. 447-462 (2006) |
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Vector spaces spanned by the angle sums of polytopesKristin A. CamengaCornell University, Ithaca, NY, e-mail: kacam@math.cornell.eduAbstract: This paper describe the spaces spanned by the angle sums of certain classes of polytopes, as recorded in the $\alpha_{}$-vector. Families of polytopes are constructed whose angle sums span the spaces of polytopes defined by the Gram and Perles equations, analogs of the Euler and Dehn-Sommerville equations. This shows that the dimension of the affine span of the space of angle sums of simplices is $\left\lfloor \frac{d-1}{2}\right\rfloor$, and that of the combined angle sums and face numbers of simplicial polytopes and general polytopes are $d-1$ and $2d-3$, respectively. A tool used in proving these results is the $\gamma$-vector, an angle analog to the $h$-vector. Full text of the article:
Electronic version published on: 19 Jan 2007. This page was last modified: 5 Nov 2009.
© 2007 Heldermann Verlag
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