Pattern Complexity of Aperiodic Substitutive Subshifts

Abstract: This paper aims to better understand the link better understand the links between aperiodicity in subshifts and pattern complexity. Our main contribution deals with substitutive subshifts, an equivalent to substitutive tilings in the context of symbolic dynamics. For a class of substitutive subshifts, we prove a quadratic lower bound on their pattern complexity. Together with an already known upper bound, this shows that this class of substitutive subshifts has a pattern complexity in $\Theta(n^2)$. We also prove that the recent bound of Kari and Moutot, showing that any aperiodic subshift has pattern complexity at least $mn+1$, is optimal for fixed $m$ and $n$.