Bounding Klarner's constant from above using a simple recurrence

Abstract

Klarner and Rivest showed that the growth of the number of polyominoes, also known as Klarner's constant, is at most 2+22<4.83 by viewing polyominoes as a sequence of twigs with appropriate weights given to each twig and studying the corresponding multivariate generating function. In this short note, we give a simpler proof by a recurrence on an upper bound. In particular, we show that the number of polyominoes with n cells is at most G(n) with G(0)=G(1)=1 and for n 2, \[ G(n) = 2Σm=1n-1 G(m)G(n-1-m). \] It should be noted that G(n) has multiple combinatorial interpretations in literature.

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