Spanning k-trees, odd [1,b]-factors and spectral radius in binding graphs

Abstract

The binding number of a graph G, written as bind(G), is defined by bind(G)=\|NG(X)||X|:≠ X⊂eq V(G),NG(X)≠ V(G)\. A graph G is called r-binding if bind(G)≥ r. An odd [1,b]-factor of a graph G is a spanning subgraph F with dF(v)∈\1,3,…,b\ for all v∈ V(G), where b≥1 is an odd integer. A spanning k-tree of a connected graph G is a spanning tree T with dT(v)≤ k for every v∈ V(G). In this paper, we first show a tight sufficient condition with respect to the adjacency spectral radius for connected 1b-binding graphs to have odd [1,b]-factors, which generalizes Fan and Lin's previous result [D. Fan, H. Lin, Binding number, k-factor and spectral radius of graphs, Electron. J. Combin. 31(1) (2024) \#P1.30] and partly improves Fan, Liu and Ao's previous result [A. Fan, R. Liu, G. Ao, Spectral radius, odd [1,b]-factor and spanning k-tree of 1-binding graphs, Linear Algebra Appl. 705 (2025) 1--16]. Then we put forward a tight sufficient condition via the adjacency spectral radius for connected 1k-2-binding graphs to have spanning k-trees, which partly improves Fan, Liu and Ao's previous result [A. Fan, R. Liu, G. Ao, Spectral radius, odd [1,b]-factor and spanning k-tree of 1-binding graphs, Linear Algebra Appl. 705 (2025) 1--16].