A characterization for graphs having strong parity factors

Abstract

A graph G has the strong parity property if for every subset X⊂eq V with |X| even, G has a spanning subgraph F with minimum degree at least one such that dF(v) 1 2 for all v∈ X, dF(y) 0 2 for all y∈ V(G)-X. Bujt\'as, Jendrol and Tuza (On specific factors in graphs, Graphs and Combin., 36 (2020), 1391-1399.) introduced the concept and conjectured that every 2-edge-connected graph with minimum degree at least three has the strong parity property. In this paper, we give a characterization for graphs to have the strong parity property and construct a counterexample to disprove the conjecture proposed by Bujt\'as, Jendrol and Tuza.