On the topology of polynomials with bounded integer coefficients
Abstract
For a real number q>1 and a positive integer m, let Ym(q):=Σi=0nεi qi:\; εi∈ \0, 1,..., m\, n=0, 1,.... In this paper, we show that Ym(q) is dense in R if and only if q<m+1 and q is not a Pisot number. This completes several previous results and answers an open question raised by Erd\"os, Jo\'o and Komornik.
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