A note on the k-defect number: Vertex Coloring with a Fixed Number of Monochromatic Edges
Abstract
In this paper, we introduce and study a novel graph parameter called the k-defect number, denoted φk(G), for a graph G and an integer 0≤ k≤ |E(G)|. Unlike traditional defective colorings that bound the local degree within monochromatic components, the k-defect number represents the smallest number of colors required to achieve a vertex coloring of G having exactly k monochromatic edges (also termed ``bad edges"). This parameter generalizes the well-known chromatic number of a graph, (G), which is precisely φ 0(G). We establish fundamental properties of the k-defect number and derive bounds on φ k(G) for specific graph classes, including trees, cycles, and wheels. Furthermore, we extend and generalize several classical properties of the chromatic number to this new edge-centric k-defect framework for values of 1≤ k≤ |E(G)|.
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