Some results on the k-strong parity property in a graph

Abstract

A graph G has the k-strong parity property if for any X⊂eq V(G) with |X| even, G contains a spanning subgraph F with dF(u)1 (mod 2) for each u∈ X and dF(v)∈\k,k+2,k+4,…\ for each v∈ V(G) X, where k≥2 is an even integer. Kano and Matsumura proposed a characterization for a graph with the k-strong parity property (M. Kano, H. Matsumura, Odd-even factors of graphs, Graphs Combin. 41 (2025) 55). In this paper, we first give a size condition for a graph to have the k-strong parity property. Then we establish a signless Laplacian spectral radius condition to guarantee that a graph has the k-strong parity property.