Hankel determinants of a Sturmian sequence
Abstract
Let τ be the substitution 1 101 and 0 1 on the alphabet \0,1\. The fixed point of τ leading by 1, denoted by s, is a Sturmian sequence. We first give a characterization of s using f-representation. Then we show that the distribution of zeros in the determinants induces a partition of integer lattices in the first quadrant. Combining those properties, we give the explicit values of the Hankel determinants Hm,n of s for all m 0 and n 1.
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