A Note on Signed k-Submatching in Graphs

Abstract

Let G be a graph of order n. For every v∈ V(G), let EG(v) denote the set of all edges incident with v. A signed k-submatching of G is a function f:E(G) \-1,1\, satisfying f(EG(v))≤ 1 for at least k vertices, where f(S)=Σe∈ Sf(e), for each S⊂eq E(G). The maximum of the value of f(E(G)), taken over all signed k-submatching f of G, is called the signed k-submatching number and is denoted by β kS(G). In this paper, we prove that for every graph G of order n and for any positive integer k ≤ n, β kS (G) ≥ n-k - ω(G), where w(G) is the number of components of G. This settles a conjecture proposed by Wang. Also, we present a formula for the computation of βSn(G).