Regular genus and gem-complexity of some mapping tori

Abstract

In this article, we construct a crystallization of the mapping torus of some (PL) homeomorphisms f:M M for a certain class of PL-manifolds M. These yield upper bounds for gem-complexity and regular genus of a large class of PL-manifolds. The bound for the regular genus is sharp for the mapping torus of some (PL) homeomorphisms f:M M, where M is RP2, RP2\#RP2, S1× S1, RP3, S2 × S1, S.2mm2 × -2.6mm- \, S.1mm1 or Sd. In particular, for M=Sd-1 × S1 or S.2mmd-1 ×-2.6mm- \, S.1mm1, our construction gives a crystallization of a mapping torus of a (PL) homeomorphism f:M M with regular genus d2-d. As a consequence, we prove the existence of an orientable mapping torus of a (PL) homeomorphism f:(S2 × S1) (S2 × S1) with regular genus 6. This disproves a conjecture of Spaggiari which states that regular genus six characterizes the topological product RP3 × S1 among closed connected prime orientable PL 4-manifolds.