Frobenius Numbers and Automatic Sequences
Abstract
The Frobenius number g(S) of a set S of non-negative integers with 1 is the largest integer not expressible as a linear combination of elements of S. Given a sequence s = (si)i ≥ 0, we can define the associated sequence G s (i) = g(\ si,si+1,… \). In this paper we compute G s (i) for some classical automatic sequences: the evil numbers, the odious numbers, and the lower and upper Wythoff sequences. In contrast with the usual methods, our proofs are based largely on automata theory and logic.
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