A note on large induced subgraphs with prescribed residues in bipartite graphs
It was proved by Scott that for every $k\ge2$, there exists a constant $c(k)>0$ such that for every bipartite $n$-vertex graph $G$ without isolated vertices, there exists an induced subgraph $H$ of order at least $c(k)n$ such that $\textrm{deg}_H(v) \equiv 1\pmod{k}$ for each $v \in H$. Scott con...
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Zusammenfassung: | It was proved by Scott that for every $k\ge2$, there exists a constant
$c(k)>0$ such that for every bipartite $n$-vertex graph $G$ without isolated
vertices, there exists an induced subgraph $H$ of order at least $c(k)n$ such
that $\textrm{deg}_H(v) \equiv 1\pmod{k}$ for each $v \in H$. Scott conjectured
that $c(k) = \Omega(1/k)$, which would be tight up to the multiplicative
constant. We confirm this conjecture. |
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DOI: | 10.48550/arxiv.2201.00296 |