Title of article
The algorithmics of solitaire-like games
Author/Authors
Roland Backhouse، نويسنده , , Wei Chen، نويسنده , , Jo?o F. Ferreira، نويسنده ,
Issue Information
ماهنامه با شماره پیاپی سال 2013
Pages
18
From page
2029
To page
2046
Abstract
One-person solitaire-like games are explored with a view to using them in teaching algorithmic problem solving. The key to understanding solutions to such games is the identification of invariant properties of polynomial arithmetic. We demonstrate this via three case studies: solitaire itself, tiling problems and a novel class of one-person games.The known classification of states of the game of (peg) solitaire into 16 equivalence classes is used to introduce the relevance of polynomial arithmetic. Then we give a novel algebraic formulation of the solution to a class of tiling problems. Finally, we introduce an infinite class of challenging one-person games, which we call “replacement-set games”, inspired by earlier work by Chen and Backhouse on the relation between cyclotomic polynomials and generalisations of the seven-trees-in-one type isomorphism. We present an algorithm to solve arbitrary instances of replacement-set games and we show various ways of constructing infinite (solvable) classes of replacement-set games.
Keywords
Solitaire , Tiling problems , cyclotomic polynomials , Replacement-set game , Seven-trees-in-one , Algorithm derivation , invariants , Type isomorphism , Cyclotomic game
Journal title
Science of Computer Programming
Serial Year
2013
Journal title
Science of Computer Programming
Record number
1080425
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