Towards a statement of the S-adic conjecture through examples
Abstract
The S-adic conjecture claims that there exists a condition C such that a sequence has a sub-linear complexity if and only if it is an S-adic sequence satisfying Condition C for some finite set S of morphisms. We present an overview of the factor complexity of S-adic sequences and we give some examples that either illustrate some interesting properties or that are counter-examples to what could be believed to be "a good Condition C".
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