Rectangulations avoiding a pattern

Abstract

Fix a strong rectangulation pattern P of size L. We show that the growth constant of the class of strong rectangulations avoiding P is strictly smaller than =27/2, the growth constant for all strong rectangulations. More precisely, forbidding any such P yields a pattern-uniform exponential drop of at least - 1/3L-1. Consequently, the proportion of P-avoiding rectangulations among all rectangulations tends to zero as n ∞. This is the first result on the uniform drop of exponential growth for pattern-avoiding rectangulations. The proof utilizes the standard correspondence with leftmost history quadrant walks, along with a pattern-insertion scheme that controls the radius of convergence of the associated generating functions, thereby establishing the first uniform exponential upper bound for rectangulation classes defined by geometric avoidance.

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