Equilibrium and equivariant triangulations of some small covers with minimum number of vertices
Abstract
Small covers were introduced by Davis and Januszkiewicz in 1991. We introduce the notion of equilibrium triangulations for small covers. We study equilibrium and vertex minimal Z22-equivariant triangulations of 2-dimensional small covers. We discuss vertex minimal equilibrium triangulations of RP3 \# RP3, S1 × RP2 and a nontrivial S1 bundle over RP2. We construct some nice equilibrium triangulations of the real projective space RPn with 2n +n+1 vertices. The main tool is the theory of small covers.
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