Hamiltonian and Pseudo-Hamiltonian Cycles and Fillings In Simplicial Complexes

Abstract

We introduce and study a d-dimensional generalization of Hamiltonian cycles in graphs - the Hamiltonian d-cycles in Knd (the complete simplicial d-complex over a vertex set of size n). Those are the simple d-cycles of a complete rank, or, equivalently, of size 1 + n-1 d. The discussion is restricted to the fields F2 and Q. For d=2, we characterize the n's for which Hamiltonian 2-cycles exist. For d=3 it is shown that Hamiltonian 3-cycles exist for infinitely many n's. In general, it is shown that there always exist simple d-cycles of size n-1 d - O(nd-3). All the above results are constructive. Our approach naturally extends to (and in fact, involves) d-fillings, generalizing the notion of T-joins in graphs. Given a (d-1)-cycle Zd-1 ∈ Knd, ~F is its d-filling if ∂ F = Zd-1. We call a d-filling Hamiltonian if it is acyclic and of a complete rank, or, equivalently, is of size n-1 d. If a Hamiltonian d-cycle Z over F2 contains a d-simplex σ, then Z σ is a a Hamiltonian d-filling of ∂ σ (a closely related fact is also true for cycles over Q). Thus, the two notions are closely related. Most of the above results about Hamiltonian d-cycles hold for Hamiltonian d-fillings as well.