Smallest bases of expansions with multiple digits
Abstract
Given two positive integers M and k, let k be the set of bases q>1 such that there exists a real number x having exactly k different q-expansions over the alphabet \0,1,·s,M\. In this paper we investigate the smallest base q2 of 2, and show that if M=2m the smallest base q2 =m+1+m2+2m+52, and if M=2m-1 the smallest base q2 is the appropriate root of x4=(m-1)\,x3+2 m\, x2+m \,x+1. Moreover, for M=2 we show that q2 is also the smallest base of k for all k 3. This turns out to be different from that for M=1.
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