On convergence of generalized continued fractions and Ramanujan's conjecture
Abstract
We consider continued fractions -a11-a21-a31-... fr with real coefficients ai converging to a limit a. S.Ramanujan had stated the theorem (see [ABJL], p.38) saying that if a≠14, then the fraction converges if and only if a<14. The statement of convergence was proved in [V] for complex ai converging to a∈ C[14,+∞) (see also [P]). J.Gill [G] proved the divergence of (fr) under the assumption that ai a>14 fast enough, more precisely, whenever Σi|ai-a|<∞.gill The Ramanujan conjecture saying that (fr) diverges always whenever ai a>14 remained up to now an open question. In the present paper we disprove it. We show (Theorem th1) that for any a>14 there exists a real sequence ai a such that (fr) converges. Moreover, we show (Theorem go) that Gill's sufficient divergence condition (gill) is the optimal condition on the speed of convergence of the ai's.
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