Some 3n-equivariant triangulations of n
Abstract
In 1983, Banchoff and Kuhnel constructed a minimal triangulation of 2 with 9 vertices. 3 was first triangulated by Bagchi and Datta in 2012 with 18 vertices. Known lower bound on number of vertices of a triangulation of n is 1 + (n + 1)22 for n ≥ 3. We give explicit construction of some triangulations of complex projective space n with 4n+1-13 vertices for all n. No explicit triangulation of n is known for n ≥ 4.
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