Mathematics of Computation

Author(s): G. Everest; I. Gaál; K. Györy; C. Röttger.
Journal: Math. Comp. 71 (2002), 633-648.
MSC (2000): Primary 11D57, 11Y50
Posted: August 3, 2001
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We study the distribution in space of the integral solutions to an integral decomposable form equation, by considering the images of these solutions under central projection onto a unit ball. If we think of the solutions as stars in the night sky, we ask what constellations are visible from the earth (the unit ball). Answers are given for a large class of examples which are then illustrated using the software packages KANT and Maple. These pictures highlight the accuracy of our predictions and arouse interest in cases not covered by our results. Within the range of applicability of our results lie solutions to norm form equations and units in abelian group rings. Thus our theory has a lot to say about where these interesting objects can be found and what they look like.

[E1]: G. R. Everest, Angular distribution of units in abelian group rings-an application to Galois-module theory, J. Reine Angew. Math. (1987), 24-41. MR 88g:11085
[E2]: G. R. Everest, Units in abelian group rings and meromorphic functions, Illinois J. Math. 33 (1989), 542-553. MR 90k:20011
[EG]: G. R. Everest, K. Györy, Counting solutions of decomposable form equations, Acta Arith. 79 (1997), 173-191. MR 98e:11037
[EvG]: J.-H. Evertse, K. Györy, The number of families of solutions of decomposable form equations, Acta Arith. 80 (1997), 367-394. MR 98e:11038
[G]: K. Györy, On the number of families of solutions of systems of decomposable form equations, Publ. Math. Debrecen 22 (1993), 65-101. MR 94e:11027
[K]: G. Karpilovsky, Unit Groups of Classical Rings, Oxford University Press, 1988. MR 90e:20007
[Ka]: M. Daberkow, C. Fieker, J. Klüners, M. Pohst, K. Roegner and K. Wildanger, KANT V4, J. Symbolic Comp. 24 (1997), 267-283. MR 99g:11150
[KN]: L. Kuipers and H. Niederreiter, Uniform Distribution of Sequences, Wiley, New York, 1974. MR 54:7415
[Sc1]: W. Schmidt, Norm form equations, Ann. of Math. 96 (1972), 526-551. MR 47:3313
[Sc2]: W. Schmidt, Diophantine Approximation, Lecture Notes in Mathematics vol. 785, Springer, 1980. MR 81j:10038
[Sc3]: W. Schmidt, Diophantine Approximation and Diophantine Equations, Lecture Notes in Mathematics vol. 1467, Springer, 1991. MR 94f:11059
[Se]: S. Sehgal, Topics in Group Rings, Dekker, New York 1978. MR 80j:16001

G. Everest
Affiliation: School of Mathematics, University of East Anglia, Norwich, Norfolk NR4 7TJ, United Kingdom
Email: g.everest@uea.ac.uk

I. Gaál
Affiliation: Institute of Mathematics and Informatics, Lajos Kossuth University, H-4010 Debrecen, Pf 12, Hungary
Email: igaal@math.klte.hu

K. Györy
Affiliation: Institute of Mathematics and Informatics, Lajos Kossuth University, H-4010 Debrecen, Pf 12, Hungary
Email: gyory@math.klte.hu

C. Röttger
Affiliation: School of Mathematics, University of East Anglia, Norwich, Norfolk NR4 7TJ, United Kingdom
Email: C.Rottger@uea.ac.uk

DOI: 10.1090/S0025-5718-01-01353-9
PII: S 0025-5718(01)01353-9
Received by editor(s): July 13, 1999
Received by editor(s) in revised form: June 6, 2000
Posted: August 3, 2001
Additional Notes: Röttger's research was supported by a PhD grant from the UEA. Györy thanks the LMS for a scheme 2 grant at an early stage of this research. Györy and Gaál were supported by the Hungarian Academy of Sciences and by grants 16975, 25157 and 29330 from the Hungarian National Foundation for Scientific Research.
Copyright of article: Copyright 2001, American Mathematical Society

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