Nullity and Loop Complementation for Delta-Matroids
Abstract
We show that the symmetric difference distance measure for set systems, and more specifically for delta-matroids, corresponds to the notion of nullity for symmetric and skew-symmetric matrices. In particular, as graphs (i.e., symmetric matrices over GF(2)) may be seen as a special class of delta-matroids, this distance measure generalizes the notion of nullity in this case. We characterize delta-matroids in terms of equicardinality of minimal sets with respect to inclusion (in addition we obtain similar characterizations for matroids). In this way, we find that, e.g., the delta-matroids obtained after loop complementation and after pivot on a single element together with the original delta-matroid fulfill the property that two of them have equal "null space" while the third has a larger dimension.
Keywords
Cite
@article{arxiv.1010.4497,
title = {Nullity and Loop Complementation for Delta-Matroids},
author = {Robert Brijder and Hendrik Jan Hoogeboom},
journal= {arXiv preprint arXiv:1010.4497},
year = {2014}
}
Comments
Changes w.r.t. v4: different style, Section 8 is extended, and in addition a few small changes are made in the rest of the paper. 15 pages, no figures