Triangulations of RPn with few vertices
Abstract
P. Arnoux and A. Marin showed that any triangulation of RPn contains more than (n+1)(n+2)2 vertices if n ≥ 3. We construct some natural triangulation of RPn with n(n+5)2-1 vertices for all n ≥ 3. Previously, it was known that RPn has Z2n-equivariant triangulation with n(n+1) vertices for n ≥ 6.
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