Finite beta-expansions of natural numbers
Abstract
Let β>1. For x ∈ [0,∞), we have so-called the β-expansion of x in base β as follows: x= Σj ≤ k xjβj = xkβk+ ·s + x1β+x0+x-1β-1 + x-2β-2 + ·s where k ∈ Z, βk ≤ x < βk+1, xj ∈ Z [0,β) for all j ≤ k and Σj ≤ nxjβj<βn+1 for all n ≤ k. In this paper, we give a sufficient condition (for β) such that each element of N has the finite beta-expansion in base β. Moreover we also find a β with this finiteness property which does not have positive finiteness property.
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