On game chromatic vertex-critical graphs
Abstract: Several games that arise from graph coloring have been introduced and studied. Let $\varphi$ denote a graph invariant that arises from such a game. If $G$ is a graph and $\varphi(G-x)\neq \varphi(G)=k$, $k \geq 1$, holds true for every vertex $x \in V(G)$, then $G$ is called a $k$-$\varphi$-game-vertex-critical graph. We study the concept of $\varphi$-game-vertex-criticality for $\varphi \in {\chi_g, \chi_i, \chi_{ig}{A}, \chi_{ig}{AB}}$, where $\chi_g$ denotes the standard game chromatic number, $\chi_i$ denotes the indicated game chromatic number and $\chi_{ig}{A}$, $\chi_{ig}{AB}$ denote two versions of the independence game chromatic number. Since the game chromatic number $\varphi(G-x)$ can either decrease or increase with respect to $\varphi(G)$, we distinguish between lower, upper and mixed vertex-criticality. We show that for $\varphi \in {\chi_g, \chi_{ig}{A}, \chi_{ig}{AB}}$ the difference $\varphi(G)-\varphi(G-x)$, $x \in V(G)$, can be arbitrarily large. A characterization of $2$-$\varphi$-game-vertex-critical and (connected) $3$-$\varphi$-lower-game-vertex-critical graphs for all $\varphi \in {\chi_g, \chi_i, \chi_{ig}{A}, \chi_{ig}{AB}}$ is given. It is shown that $\chi_g$-game-vertex-critical, $\chi_{ig}{A}$-game-vertex-critical and $\chi_{ig}{AB}$-game-vertex-critical graphs are not necessarily connected. However, it is also shown that $\chi_i$-lower-game-vertex-critical graphs are always connected.
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