From the icosahedron to natural triangulations of P2 and S2 × S2

Abstract

We present two constructions in this paper: (a) A 10-vertex triangulation P210 of the complex projective plane P2 as a subcomplex of the join of the standard sphere (S24) and the standard real projective plane ( P26, the decahedron), its automorphism group is A4; (b) a 12-vertex triangulation (S2 × S2)12 of S2 × S2 with automorphism group 2S5, the Schur double cover of the symmetric group S5. It is obtained by generalized bistellar moves from a simplicial subdivision of the standard cell structure of S2 × S2. Both constructions have surprising and intimate relationships with the icosahedron. It is well known that P2 has S2 × S2 as a two-fold branched cover; we construct the triangulation P210 of P2 by presenting a simplicial realization of this covering map S2 × S2 P2. The domain of this simplicial map is a simplicial subdivision of the standard cell structure of S2 × S2, different from the triangulation alluded to in (b). This gives a new proof that Kuehnel's P29 triangulates P2. It is also shown that P210 and (S2 × S2)12 induce the standard piecewise linear structure on P2 and S2 × S2 respectively.