Campus Event Calendar
Event Entry
What and Who
Pegging Numbers for Various Tree Graphs
Ariel Levavi
Max-Planck-Institut für Informatik - D1
AG1 Mittagsseminar (own work)
AG 1
AG Audience
English
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Date, Time and Location
Friday, 19 December 2008
13:30
30 Minutes
E1 4
024
Saarbrücken
Abstract
In the game of pegging, each vertex of a graph is considered a hole into which a peg can be placed. A pegging move is performed by jumping one peg over another peg, and then removing the peg that has been jumped over from the graph. We define the pegging number as the smallest number of pegs needed to reach all the vertices in a graph no matter what the distribution. Similarly, the optimal-pegging number of a graph is defined as the smallest distribution of pegs for which all the vertices in the graph can be reached. We obtain tight bounds on the pegging numbers and optimal-pegging numbers of complete binary trees and compute the optimal-pegging numbers of complete infinitary trees. As a result of these computations, we deduce that there is a tree whose optimal-pegging number is strictly increased by removing a leaf.
Contact
Ariel Rebecca Levavi
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Ariel Rebecca Levavi, 11/16/2008 16:31 -- Created document.