Abstract
Space of spatial polygons in Euclidean spaces has been studied extensively in [3, 1, 2]. There is a beautiful description of cohomology in [1]. In this paper we introduce another, easy to compute method to obtain the cohomology without using toric variety arguments. We also give a criterion for a polygon space to be Fano, thus, having ample anticanonical class.
Original language | American English |
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State | Submitted - Nov 1 2006 |
Publication series
Name | arXiv |
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Disciplines
- Mathematics