Counting Non-Standard Binary Representations

Journal of Integer Sequences, Vol. 19 (2016), Article 16.3.3

Counting Non-Standard Binary Representations

Katie Anders
Department of Mathematics
University of Texas at Tyler
3900 University Blvd.
Tyler, TX 75799
USA

Abstract:

Let $\mathcal{A}$ be a finite subset of $\mathbb{N}$ including 0 and let $f_\mathcal{A}(n)$ be the number of ways to write $n=\sum_{i=0}^{\infty}\epsilon_i2^i$ , where $\epsilon_i\in\mathcal{A}$ . We consider asymptotics of the summatory function $s_\mathcal{A}(r,m)$ of $f_\mathcal{A}(n)$ from m2^r to m2^r+1-1, and show that $s_{\mathcal{A}}(r,m)\sim c(\mathcal{A},m)\left\vert\mathcal{A}\right\vert^r$ for some nonzero $c(\mathcal{A},m)\in\mathbb{Q}$ .

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Received August 25 2015; revised versions received January 19 2016; March 11 2016; April 5 2016. Published in Journal of Integer Sequences, April 6 2016.

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Counting Non-Standard Binary Representations

Katie Anders Department of Mathematics University of Texas at Tyler 3900 University Blvd. Tyler, TX 75799 USA

Katie Anders
Department of Mathematics
University of Texas at Tyler
3900 University Blvd.
Tyler, TX 75799
USA