A minimal triangulation of complex projective plane admitting a chess colouring of four-dimensional simplices

Abstract

In this paper we construct and study a new 15-vertex triangulation X of the complex projective plane 2. The automorphism group of X is isomorphic to S4× S3. We prove that the triangulation X is the minimal by the number of vertices triangulation of 2 admitting a chess colouring of four-dimensional simplices. We provide explicit parametrizations for simplices of X and show that the automorphism group of X can be realized as a group of isometries of the Fubini--Study metric. We provide a 33-vertex subdivision of the triangulation X such that the classical moment mapping μ:22 is a simplicial mapping of the triangulation onto the barycentric subdivision of the triangle 2. We study the relationship of the triangulation X with complex crystallographic groups.