Solutions of diophantine equations as periodic points of p-adic algebraic functions, II: The Rogers-Ramanujan continued fraction
Abstract
In this part we show that the diophantine equation X5+Y5=5(1-X5Y5), where =-1+52, has solutions in specific abelian extensions of quadratic fields K=Q(-d) in which -d 1 (mod 5). The coordinates of these solutions are values of the Rogers-Ramanujan continued fraction r(τ), and are shown to be periodic points of an algebraic function.
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