The characteristic sequence of the integers that are the sum of two squares is not morphic

Abstract

Let (s2(n))n∈ N be a 0,1-sequence such that, for any natural number n, s2(n) = 1 if and only if n is a sum of two squares. In a recent article, Tahay proved that the sequence (s2(n))n∈ N is not k-automatic for any integer k, and asked if this sequence can be morphic. In this note, we give a negative answer to this question.

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