Given a nonnegative integer $d$ and a graph $G$, let $f_d(G)$ be the maximum order of an induced forest in $G$ having maximum degree at most $d$. We seek lower bounds for $f_d(G)$ based on the order and treewidth of $G$.We show that, for all $k,d\ge 2$ and $n\ge 1$, if $G$ is a graph with order $n$ and treewidth at most $k$, then $f_d(G)\ge\lceil{(2dn+2)/(kd+d+1)}\rceil$, unless $G\in\{K_{1,1,3},K_{2,3}\}$ and $k=d=2$. We give examples that show that this bound is tight to within $1$.We conjecture a bound for $d=1$: $f_1(G) \ge\lceil{2n/(k+2)}\rceil$, which would also be tight to within $1$, and we prove it for $k\le 3$. For $k\ge 4$ the conjecture remains open, and we prove a weaker bound: $f_1(G)\ge (2n+2)/(2k+3)$. We also examine the cases $d=0$ and $k=0,1$.Lastly, we consider open problems relating to $f_d$ for graphs on a given surface, rather than graphs of bounded treewidth.
@article{10_37236_3826,
author = {Glenn G. Chappell and Michael J. Pelsmajer},
title = {Maximum induced forests in graphs of bounded treewidth},
journal = {The electronic journal of combinatorics},
year = {2013},
volume = {20},
number = {4},
doi = {10.37236/3826},
zbl = {1295.05129},
url = {http://geodesic.mathdoc.fr/articles/10.37236/3826/}
}
TY - JOUR
AU - Glenn G. Chappell
AU - Michael J. Pelsmajer
TI - Maximum induced forests in graphs of bounded treewidth
JO - The electronic journal of combinatorics
PY - 2013
VL - 20
IS - 4
UR - http://geodesic.mathdoc.fr/articles/10.37236/3826/
DO - 10.37236/3826
ID - 10_37236_3826
ER -
%0 Journal Article
%A Glenn G. Chappell
%A Michael J. Pelsmajer
%T Maximum induced forests in graphs of bounded treewidth
%J The electronic journal of combinatorics
%D 2013
%V 20
%N 4
%U http://geodesic.mathdoc.fr/articles/10.37236/3826/
%R 10.37236/3826
%F 10_37236_3826
Glenn G. Chappell; Michael J. Pelsmajer. Maximum induced forests in graphs of bounded treewidth. The electronic journal of combinatorics, Tome 20 (2013) no. 4. doi: 10.37236/3826
