Binding Number, $k$-Factor and Spectral Radius of Graphs

Abstract: The binding number $b(G)$ of a graph $G$ is the minimum value of $|N_{G}(X)|/|X|$ taken over all non-empty  subsets $X$ of $V(G)$ such that $N_{G}(X)\neq V(G)$. The association between the binding number and toughness is intricately interconnected, as both metrics function as pivotal indicators for quantifying the vulnerability of a graph. The Brouwer-Gu Theorem asserts that for any $d$-regular connected graph $G$, the toughness $t(G)$ always at least $\frac{d}{\lambda}-1$, where $\lambda$ denotes the second l… Show more

Binding number, odd [1,b]-factors and the distance spectral radius

Binding number, odd [1,b]-factors and the distance spectral radius

Spectral radius, odd [1,b]-factor and spanning k-tree of 1-binding graphs

Binding Number and Fractional <i>k</i>-Factors of Graphs