The Euler characteristic of the regular spherical polygon spaces
Abstract
Let a be a real number satisfying 0<a<π. We denote by Mn(a) the configuration space of regular spherical n-gons with side-lengths a. The purpose of this paper is to determine (Mn(a)) for all a and odd n. To do so, we construct a manifold Xn and a function μ: Xn R such that μ-1(a)=Mn(a). In fact, the function μ is different from the well-known "wall-crossing" function. We determine the index of each critical point of μ. Since a level set is obtained by successive Morse surgeries, we can determine (Mn(a)).
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