6533b7dbfe1ef96bd1270baa

RESEARCH PRODUCT

Combinatorial aspects of L-convex polyominoes

Emanuele MunariniSimone RinaldiAndrea FrosiniGiusi CastiglioneAntonio Restivo

subject

Discrete mathematicsClass (set theory)Mathematics::CombinatoricsPolyominoEnumerationOpen problemGenerating functionRegular polygonPolyominoesNatural numberComputer Science::Computational GeometryFormal SeriesCombinatoricsCardinalityRegular languageDiscrete Mathematics and CombinatoricsTomographyAlgorithmsbinary tomographyMathematicsEnumeration; Formal Series; Polyominoes

description

We consider the class of L-convex polyominoes, i.e. those polyominoes in which any two cells can be connected with an ''L'' shaped path in one of its four cyclic orientations. The paper proves bijectively that the number f"n of L-convex polyominoes with perimeter 2(n+2) satisfies the linear recurrence relation f"n"+"2=4f"n"+"1-2f"n, by first establishing a recurrence of the same form for the cardinality of the ''2-compositions'' of a natural number n, a simple generalization of the ordinary compositions of n. Then, such 2-compositions are studied and bijectively related to certain words of a regular language over four letters which is in turn bijectively related to L-convex polyominoes. In the last section we give a solution to the open problem of determining the generating function of the area of L-convex polyominoes.

yearjournalcountryeditionlanguage
2007-08-01European Journal of Combinatorics
10.1016/j.ejc.2006.06.020http://dx.doi.org/10.1016/j.ejc.2006.06.020