Induced Ramsey problems for trees and graphs with bounded treewidth
The induced $q$-color size-Ramsey number $\hat{r}_{\text{ind}}(H;q)$ of a graph $H$ is the minimal number of edges a host graph $G$ can have so that every $q$-edge-coloring of $G$ contains a monochromatic copy of $H$ which is an induced subgraph of $G$. A natural question, which in the non-induced c...
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| creator | Hunter, Zach Sudakov, Benny |
| description | The induced $q$-color size-Ramsey number $\hat{r}_{\text{ind}}(H;q)$ of a
graph $H$ is the minimal number of edges a host graph $G$ can have so that
every $q$-edge-coloring of $G$ contains a monochromatic copy of $H$ which is an
induced subgraph of $G$. A natural question, which in the non-induced case has
a very long history, asks which families of graphs $H$ have induced Ramsey
numbers that are linear in $|H|$. We prove that for every $k,w,q$, if $H$ is an
$n$-vertex graph with maximum degree $k$ and treewidth at most $w$, then
$\hat{r}_{\text{ind}}(H;q) = O_{k,w,q}(n)$. This extends several old and recent
results in Ramsey theory. Our proof is quite simple and relies upon a novel
reduction argument. |
| doi_str_mv | 10.48550/arxiv.2406.00352 |
| format | Article |
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graph $H$ is the minimal number of edges a host graph $G$ can have so that
every $q$-edge-coloring of $G$ contains a monochromatic copy of $H$ which is an
induced subgraph of $G$. A natural question, which in the non-induced case has
a very long history, asks which families of graphs $H$ have induced Ramsey
numbers that are linear in $|H|$. We prove that for every $k,w,q$, if $H$ is an
$n$-vertex graph with maximum degree $k$ and treewidth at most $w$, then
$\hat{r}_{\text{ind}}(H;q) = O_{k,w,q}(n)$. This extends several old and recent
results in Ramsey theory. Our proof is quite simple and relies upon a novel
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graph $H$ is the minimal number of edges a host graph $G$ can have so that
every $q$-edge-coloring of $G$ contains a monochromatic copy of $H$ which is an
induced subgraph of $G$. A natural question, which in the non-induced case has
a very long history, asks which families of graphs $H$ have induced Ramsey
numbers that are linear in $|H|$. We prove that for every $k,w,q$, if $H$ is an
$n$-vertex graph with maximum degree $k$ and treewidth at most $w$, then
$\hat{r}_{\text{ind}}(H;q) = O_{k,w,q}(n)$. This extends several old and recent
results in Ramsey theory. Our proof is quite simple and relies upon a novel
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graph $H$ is the minimal number of edges a host graph $G$ can have so that
every $q$-edge-coloring of $G$ contains a monochromatic copy of $H$ which is an
induced subgraph of $G$. A natural question, which in the non-induced case has
a very long history, asks which families of graphs $H$ have induced Ramsey
numbers that are linear in $|H|$. We prove that for every $k,w,q$, if $H$ is an
$n$-vertex graph with maximum degree $k$ and treewidth at most $w$, then
$\hat{r}_{\text{ind}}(H;q) = O_{k,w,q}(n)$. This extends several old and recent
results in Ramsey theory. Our proof is quite simple and relies upon a novel
reduction argument.</abstract><doi>10.48550/arxiv.2406.00352</doi><oa>free_for_read</oa></addata></record> |
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| title | Induced Ramsey problems for trees and graphs with bounded treewidth |
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