Irrationality and transcendence of continued fractions with algebraic integers
Abstract
We extend a result of Hancl, Kolouch and Nair on the irrationality and transcendence of continued fractions. We show that for a sequence \αn\ of algebraic integers of bounded degree, each attaining the maximum absolute value among their conjugates and satisfying certain growth conditions, the condition n → ∞ αn1Ddn-1 Πi=1n-2(Ddi + 1) = ∞ implies that the continued fraction α = [0;α1, α2, …] is not an algebraic number of degree less than or equal to D.
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