On the Divergence of the Rogers-Ramanujan Continued Fraction on the Unit Circle
Abstract
Let the continued fraction expansion of any irrational number t ∈ (0,1) be denoted by [0,a1(t),a2(t),...] and let the i-th convergent of this continued fraction expansion be denoted by ci(t)/di(t). Let \[ S=\t ∈ (0,1): ai+1(t) ≥ φdi(t) infinitely often\, \] where φ = (5+1)/2. Let YS =\(2 π i t): t ∈ S \. It is shown that if y ∈ YS then the Rogers-Ramanujan continued fraction, R(y), diverges at y. S is an uncountable set of measure zero. It is also shown that there is an uncountable set of points, G ⊂ YS, such that if y ∈ G, then R(y) does not converge generally. It is further shown that R(y) does not converge generally for |y| > 1 and that R(y) does converge generally if y is a primitive 5m-th root of unity, some m ∈ N.
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