A Modular Structure Theorem for Minimal Periodic Decompositions and Periodicity of Configurations with Pη(4,n) ≤ 4n

Abstract

Nivat's conjecture asserts that every two-dimensional configuration η: Z2 A whose rectangular pattern complexity satisfies Pη(k,n) ≤ kn for some k,n ∈ N is periodic. A theorem of Cyr and Kra CyrKra16 establishes the conjecture in the short-rectangle case Pη(k,n) ≤ kn, with k ≤ 3. Using the algebraic framework of Kari-Szabados KariSzabados20 and recent advances on periodic decompositions and one-sided nonexpansive directions Colle23,Colle22, we extend the Cyr-Kra result to the case Pη(4,n) ≤ 4n: every configuration satisfying this complexity bound is periodic. The key new ingredient is an intermediate structural theorem of independent interest: for any non-periodic configuration with low convex pattern complexity and integer-valued alphabet A contained in Z+, there exist a configuration in the orbit closure of η, a Z-minimal periodic decomposition = 1+·s+m, a prime p ∈ N with A ⊂ [[p]], and pairs of disjoint half-planes Ui,Vi ⊂ Z2 such that the reductions modulo p of the components i are fully periodic on Ui and on Vi simultaneously, for each 1 ≤ i ≤ m.