A simple combinatorial algorithm for restricted 2-matchings in subcubic graphs -- via half-edges
Abstract
We consider three variants of the problem of finding a maximum weight restricted -matching in a subcubic graph . (A -matching is any subset of the edges such that each vertex is incident to at most two of its edges.) Depending on the variant a restricted -matching means a -matching that is either triangle-free or square-free or both triangle- and square-free. While there exist polynomial time algorithms for the first two types of -matchings, they are quite complicated or use advanced methodology. For each of the three problems we present a simple reduction to the computation of a maximum weight -matching. The reduction is conducted with the aid of half-edges. A half-edge of edge is, informally speaking, a half of containing exactly one of its endpoints. For a subset of triangles of , we replace each edge of such a triangle with two half-edges. Two half-edges of one edge of weight may get different weights, not necessarily equal to . In the metric setting when the edge weights satisfy the triangle inequality, this has a geometric interpretation connected to how an incircle partitions the edges of a triangle. Our algorithms are additionally faster than those known before. The running time of each of them is , where denotes the number of vertices in the graph.
Cite
@article{arxiv.2012.15775,
title = {A simple combinatorial algorithm for restricted 2-matchings in subcubic graphs -- via half-edges},
author = {Katarzyna Paluch and Mateusz Wasylkiewicz},
journal= {arXiv preprint arXiv:2012.15775},
year = {2021}
}