English

Optimal Homologous Cycles, Total Unimodularity, and Linear Programming

Algebraic Topology 2011-01-28 v3 Computational Geometry Data Structures and Algorithms Optimization and Control

Abstract

Given a simplicial complex with weights on its simplices, and a nontrivial cycle on it, we are interested in finding the cycle with minimal weight which is homologous to the given one. Assuming that the homology is defined with integer coefficients, we show the following : For a finite simplicial complex KK of dimension greater than pp, the boundary matrix [p+1][\partial_{p+1}] is totally unimodular if and only if Hp(L,L0)H_p(L, L_0) is torsion-free, for all pure subcomplexes L0,LL_0, L in KK of dimensions pp and p+1p+1 respectively, where L0L_0 is a subset of LL. Because of the total unimodularity of the boundary matrix, we can solve the optimization problem, which is inherently an integer programming problem, as a linear program and obtain integer solution. Thus the problem of finding optimal cycles in a given homology class can be solved in polynomial time. This result is surprising in the backdrop of a recent result which says that the problem is NP-hard under Z2\mathbb{Z}_2 coefficients which, being a field, is in general easier to deal with. One consequence of our result, among others, is that one can compute in polynomial time an optimal 2-cycle in a given homology class for any finite simplicial complex embedded in R3\mathbb{R}^3. Our optimization approach can also be used for various related problems, such as finding an optimal chain homologous to a given one when these are not cycles.

Keywords

Cite

@article{arxiv.1001.0338,
  title  = {Optimal Homologous Cycles, Total Unimodularity, and Linear Programming},
  author = {Tamal K. Dey and Anil N. Hirani and Bala Krishnamoorthy},
  journal= {arXiv preprint arXiv:1001.0338},
  year   = {2011}
}

Comments

Earlier version of this paper appeared in the 42nd ACM Symposium on Theory of Computing (STOC 2010). In this version we complete the characterization in terms of Moebius complexes. Added more information to the experimental results section. Fixed typos

R2 v1 2026-06-21T14:30:18.411Z