The \(t\)-pebbling number is eventually linear in \(t\)
The electronic journal of combinatorics, Tome 18 (2011) no. 1
In graph pebbling games, one considers a distribution of pebbles on the vertices of a graph, and a pebbling move consists of taking two pebbles off one vertex and placing one on an adjacent vertex. The $t$-pebbling number $\pi_t(G)$ of a graph $G$ is the smallest $m$ such that for every initial distribution of $m$ pebbles on $V(G)$ and every target vertex $x$ there exists a sequence of pebbling moves leading to a distibution with at least $t$ pebbles at $x$. Answering a question of Sieben, we show that for every graph $G$, $\pi_t(G)$ is eventually linear in $t$; that is, there are numbers $a,b,t_0$ such that $\pi_t(G)=at+b$ for all $t\ge t_0$. Our result is also valid for weighted graphs, where every edge $e=\{u,v\}$ has some integer weight $\omega(e)\ge 2$, and a pebbling move from $u$ to $v$ removes $\omega(e)$ pebbles at $u$ and adds one pebble to $v$.
@article{10_37236_640,
author = {Michael Hoffmann and Ji\v{r}{\'\i} Matou\v{s}ek and Yoshio Okamoto and Philipp Zumstein},
title = {The \(t\)-pebbling number is eventually linear in \(t\)},
journal = {The electronic journal of combinatorics},
year = {2011},
volume = {18},
number = {1},
doi = {10.37236/640},
zbl = {1222.05188},
url = {http://geodesic.mathdoc.fr/articles/10.37236/640/}
}
TY - JOUR AU - Michael Hoffmann AU - Jiří Matoušek AU - Yoshio Okamoto AU - Philipp Zumstein TI - The \(t\)-pebbling number is eventually linear in \(t\) JO - The electronic journal of combinatorics PY - 2011 VL - 18 IS - 1 UR - http://geodesic.mathdoc.fr/articles/10.37236/640/ DO - 10.37236/640 ID - 10_37236_640 ER -
Michael Hoffmann; Jiří Matoušek; Yoshio Okamoto; Philipp Zumstein. The \(t\)-pebbling number is eventually linear in \(t\). The electronic journal of combinatorics, Tome 18 (2011) no. 1. doi: 10.37236/640
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