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On the Galois groups of the iterates of x2+1

Published online by Cambridge University Press:  26 February 2010

J. E. Cremona
J. E. Cremona
Affiliation:
Department of Mathematics, University of Exeter, North Park Road, Exeter. EX4 4QE.
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Extract

§1. Introduction. In [1], Odoni discusses the iterates of the polynomial x2 +1 and their Galois groups over the rationals (a problem initially proposed by J. McKay). Setting f1,(x) = x2+1 and fn(x) =f1(fn-1(X)) for n ≥ 2, write Kn for the splitting field of fn(x) over and Ωn = Gal (Kn/). Then Odoni proves that Ωn is isomorphic to a subgroup of [C2]n, the nth wreath power of the cyclic group C2 of order 2, and gives a simple rational criterion for Ωn [C2]n to hold. In this note we describe a computer implementation of Odoni's criterion, and state the result that Ωn [C2]n for n ≤ 5 × 107.

Type
Research Article
Information
Mathematika , Volume 36 , Issue 2 , December 1989 , pp. 259 - 261
Copyright
Copyright © University College London 1989

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References

1.Odoni, R. W. K.. Realising wreath products of cyclic groups as Galois groups. Mathematika, 35 (1988), 101113.CrossRefGoogle Scholar