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A lower bound on the order of the largest induced forest in planar graphs with high girth

We give here new upper bounds on the size of a smallest feedback vertex set in planar graphs with high girth. In particular, we prove that a planar graph with girth $g$ and size $m$ has a feedback vertex set of size at most $\frac{4m}{3g}$, improving the trivial bound of $\frac{2m}{g}$. We also prove that every $2$-connected graph with maximum degree $3$ and order $n$ has a feedback vertex set of size at most $\frac{n+2}{3}$.

preprint2015arXivOpen access
François DrossMickael MontassierAlexandre Pinlou
math.CODiscrete Mathematics
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François DrossMickael MontassierAlexandre Pinlou

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