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is not necessarily uniform, but rather satisfies the analogue of an algebraic equation. We show that these sequences coincide with 
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doi:10.1016/S0304-3975(02)00587-X 
Copyright © 2002 Elsevier Science B.V. All rights reserved.
The asymptotic distribution of elements in automatic sequences
Manfred Peter
Received 27 March 2002;
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Abstract
In an automatic sequence an element need not have an asymptotic density. In this paper a necessary and sufficient criterion is proved for the existence of the asymptotic density of a given element. If it does not exist the asymptotic distribution of the element can be described in terms of a function H whose graph is self-similar. An algorithm is given to decide whether H is piecewise continuously differentiable, and in this case it can be computed effectively. Finally, it is shown that the H∞-density of an element in an automatic sequence always exists and equals its logarithmic density.
Author Keywords: Automata; Density; Asymptotics; Hölder mean; Self-similarity; Oscillating sum
Mathematical subject codes: 11B85; 68Q45
