English

On quantum topology, hypergraphs and flag vectors

q-alg 2008-02-03 v1 Quantum Algebra

Abstract

Each rule ff that assigns a vector f(G)f(G) to an (n+1)(n+1)-graph GG determines a class (or property) of nn-manifold invariants. An invariant v=v(M)v=v(M) is in this class if, for any triangulated manifold G=M|G|=M, one has that v(M)v(M) is a linear function of f(G)f(G). This paper defines a flag vector f(G)f(G) for ii-graphs, whose associated invariants might be quantum, and which is of interest in its own right. The definition (via the concept of shelling, and a `disjoint pair of optional cells' rule for the link) seems to apply to any finite combinatorial object, and so to any compact topological object that can be triangulated. It also applies to finite groups.

Keywords

Cite

@article{arxiv.q-alg/9708001,
  title  = {On quantum topology, hypergraphs and flag vectors},
  author = {Jonathan Fine},
  journal= {arXiv preprint arXiv:q-alg/9708001},
  year   = {2008}
}

Comments

14 pages