Generalizing Kirchhoff laws for Signed Graphs
Abstract
Kirchhoff-type Laws for signed graphs are characterized by generalizing transpedances through the incidence-oriented structure of bidirected graphs. The classical -arborescence interpretation of Tutte is shown to be equivalent to single-element Boolean classes of reduced incidence-based cycle covers, called contributors. A generalized contributor-transpedance is introduced using entire Boolean classes that naturally cancel in a graph; classical conservation is proven to be property of the trivial Boolean classes. The contributor-transpedances on signed graphs are shown to produce non-conservative Kirchhoff-type Laws, where every contributor possesses the unique source-sink path property. Finally, the maximum value of a contributor-transpedance is calculated through the signless Laplacian.
Cite
@article{arxiv.2009.12680,
title = {Generalizing Kirchhoff laws for Signed Graphs},
author = {Lucas J. Rusnak and Josephine Reynes and Skyler J. Johnson and Peter Ye},
journal= {arXiv preprint arXiv:2009.12680},
year = {2020}
}
Comments
22 pages, 16 figures