In 2011, Beeler and Hoilman generalized the game of peg solitaire to arbitrary connected graphs. In the same article, the authors proved some results on the solvability of Cartesian products, given solvable or distance 2-solvable graphs. We extend these results to Cartesian products of certain unsolvable graphs. In particular, we prove that ladders and grid graphs are solvable and, further, even the Cartesian product of two stars, which in a sense are the "most" unsolvable graphs
Peg Duotaire is a two-player version of the classical puzzle called Peg Solitaire. Players take turn...
AbstractThe cartesian product of a graph G with K2 is called a prism over G. We extend known conditi...
We study the inheritance of path-pairability in the Cartesian product of graphs and prove additive a...
There have been several papers on the subject of traditional peg solitaire on different boards. Howe...
The game of peg solitaire on graphs was introduced by Beeler and Hoilman in 2011. In this game, pegs...
Peg solitaire is a game in which pegs are placed in every hole but one and the player jumps over peg...
Peg solitaire is classically a one-player game played on a grid board containing pegs. The goal of t...
In a 2011 paper by Beeler and Hoilman, the game of peg solitaire is generalized to arbitrary boards....
In a recent work by Beeler and Hoilman, the game of peg solitaire is generalized to arbitrary boards...
Peg solitaire has recently been generalized to graphs. Here, pegs start on all but one of the vertic...
Peg solitaire is a game in which pegs are placed in every hole but one and the player jumps over peg...
In a 2011 paper by Beeler and Hoilman, the traditional game of peg solitaire is generalized to graph...
Peg solitaire is a game in which pegs are placed in every hole but one and the player jumps over peg...
In a paper by Beeler and Hoilman, the traditional game of peg solitaire is generalized to graphs in ...
AbstractIn the paper we obtain some conditions under which the binding number bind (G) of a Cartesia...
Peg Duotaire is a two-player version of the classical puzzle called Peg Solitaire. Players take turn...
AbstractThe cartesian product of a graph G with K2 is called a prism over G. We extend known conditi...
We study the inheritance of path-pairability in the Cartesian product of graphs and prove additive a...
There have been several papers on the subject of traditional peg solitaire on different boards. Howe...
The game of peg solitaire on graphs was introduced by Beeler and Hoilman in 2011. In this game, pegs...
Peg solitaire is a game in which pegs are placed in every hole but one and the player jumps over peg...
Peg solitaire is classically a one-player game played on a grid board containing pegs. The goal of t...
In a 2011 paper by Beeler and Hoilman, the game of peg solitaire is generalized to arbitrary boards....
In a recent work by Beeler and Hoilman, the game of peg solitaire is generalized to arbitrary boards...
Peg solitaire has recently been generalized to graphs. Here, pegs start on all but one of the vertic...
Peg solitaire is a game in which pegs are placed in every hole but one and the player jumps over peg...
In a 2011 paper by Beeler and Hoilman, the traditional game of peg solitaire is generalized to graph...
Peg solitaire is a game in which pegs are placed in every hole but one and the player jumps over peg...
In a paper by Beeler and Hoilman, the traditional game of peg solitaire is generalized to graphs in ...
AbstractIn the paper we obtain some conditions under which the binding number bind (G) of a Cartesia...
Peg Duotaire is a two-player version of the classical puzzle called Peg Solitaire. Players take turn...
AbstractThe cartesian product of a graph G with K2 is called a prism over G. We extend known conditi...
We study the inheritance of path-pairability in the Cartesian product of graphs and prove additive a...