Geodesic
Coloring graph classes with no induced fork via perfect divisibility
T. Karthick ; Jenny Kaufmann ; Vaidy Sivaraman1
1Mississippi State University
The electronic journal of combinatorics, Tome 29 (2022) no. 3
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For a graph $G$, $\chi(G)$ will denote its chromatic number, and $\omega(G)$ its clique number. A graph $G$ is said to be perfectly divisible if for all induced subgraphs $H$ of $G$, $V(H)$ can be partitioned into two sets $A$, $B$ such that $H[A]$ is perfect and $\omega(H[B]) < \omega(H)$. An integer-valued function $f$ is called a $\chi$-binding function for a hereditary class of graphs $\cal C$ if $\chi(G) \leq f(\omega(G))$ for every graph $G\in \cal C$. The fork is the graph obtained from the complete bipartite graph $K_{1,3}$ by subdividing an edge once. The problem of finding a quadratic $\chi$-binding function for the class of fork-free graphs is open. In this paper, we study the structure of some classes of fork-free graphs; in particular, we study the class of (fork, $F$)-free graphs $\cal G$ in the context of perfect divisibility, where $F$ is a graph on five vertices with a stable set of size three, and show that every $G\in \cal G$ satisfies $\chi(G)\le \omega(G)^2$. We also note that the class $\cal G$ does not admit a linear $\chi$-binding function.
DOI : 10.37236/10348
Classification : 05C15, 05C17, 05C75
Mots-clés : perfect graph, perfect divisibility, fork, \(\chi\)-bounding function

T. Karthick     ; Jenny Kaufmann    ; Vaidy Sivaraman  1

1 Mississippi State University 
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     title = {Coloring graph classes with no induced fork via perfect divisibility},
     journal = {The electronic journal of combinatorics},
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T. Karthick ; Jenny  Kaufmann; Vaidy Sivaraman. Coloring graph classes with no induced fork via perfect divisibility. The electronic journal of combinatorics, Tome 29 (2022) no. 3. doi: 10.37236/10348

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