Sufficient conditions for a graph with minimum degree to be k-critical with respect to [1,b]-odd factor

Abstract

A spanning subgraph F of a graph G is called a [1,b]-odd factor if b1 (mod 2) and dF(v)∈\1,3,…,b\ for every v∈ V(G). A graph G of order n≥ k+2 is k-critical with respect to [1,b]-odd factor if for any X⊂eq V(G) with |X|=k, G-X has a [1,b]-odd factor. In this paper, we provide a size and spectral radius conditions for a graph with minimum degree to be k-critical with respect to [1,b]-odd factor, respectively.

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