Reflection on the reflection complexity
Abstract
The factor complexity C u of a sequence u = u0u1u2 ·s over a finite alphabet counts the number of factors of length n occurring in u, i.e., C u(n) = \# Ln( u), where Ln( u)= \uiui+1·s ui+n-1: i ∈ N\. Two factors of Ln( u) are said to be equivalent if one factor is the reversal of the other one. Recently, Allouche et al. introduced the reflection complexity r u which counts the number of non-equivalent factors of Ln( u). They formulated the following conjecture: a sequence u is eventually periodic if and only if r u(n+2) = r u(n) for some n ∈ N. Here we prove the conjecture and characterize the sequences for which r u(n+2) = r u(n)+1 for every n ∈ N and also the sequences for which the equality is satisfied for every sufficiently large n ∈ N.
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