-graphic delta-matroids and their applications

Abstract

For an abelian group , a -labelled graph is a graph whose vertices are labelled by elements of . We prove that a certain collection of edge sets of a -labelled graph forms a delta-matroid, which we call a -graphic delta-matroid, and provide a polynomial-time algorithm to solve the separation problem, which allows us to apply the symmetric greedy algorithm of Bouchet to find a maximum weight feasible set in such a delta-matroid. We present two algorithmic applications on graphs; Maximum Weight Packing of Trees of Order Not Divisible by k and Maximum Weight S-Tree Packing. We also discuss various properties of -graphic delta-matroids.