A family of integer Somos sequences
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Date
2016
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Publisher
Editura Acad Romane
Abstract
Somos sequences are sequences of rational numbers defined by a bilinear recurrence relation. Remarkably, although the recurrences describing the Somos sequences are rational, some Somos sequences turn out to have only integer terms. In this paper, a family of Somos 4 sequences is given and it is proved that all Somos 4 sequences associated to Tate normal forms with h(-1) - +/- 1 consist entirely of integers for n >= 0. It is also shown that there are infinitely many squares and infinitely many cubes in Somos 4 sequences associated to Tate normal forms.
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Keywords
Mathematics, Somos sequences, Elliptic curves, Torsion points, Elliptic divisibility sequences, Lucas sequences, Laurent phenomenon, Perfect powers, Squares, Cubes, Fibonacci, Torsion, Curves
Citation
Gezer, B. vd. (2016). "A family of integer Somos sequences". Mathematical Reports, 18(3), 417-435.