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Representation of spinor exceptional integers by ternary quadratic forms

Published online by Cambridge University Press:  22 January 2016

A. G. Earnest
A. G. Earnest*
Affiliation:
Department of Mathematics, Southern Illinois University, Carbondale, Illinois 62901, USA
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The existence and basic properties of what are now referred to as spinor exceptional integers for a genus of integral ternary quadratic forms were first observed in the 1950’s by Jones and Watson [7] and Kneser [8] in the context of indefinite forms. The study of these integers and their generalizations has been undertaken by a number of authors in recent years, and has contributed significantly to the understanding of representation properties unique to ternary forms. In this direction, the present author proved in a previous paper [4] that if c is a primitive spinor exceptional integer for a genus of integral ternary quadratic forms and f is some form in this genus, then a form in the spinor genus of f primitively represents c if and only if f primitively represents an integer of the type ct2, for some odd positive integer t, relatively prime to the discriminant d, which satisfies the condition that the Jacobi symbol (–cd/t) equals 1.

Type
Research Article
Information
Nagoya Mathematical Journal , Volume 93 , March 1984 , pp. 27 - 38
Copyright
Copyright © Editorial Board of Nagoya Mathematical Journal 1984

References

[ 1 ] Benham, J. W. and Hsia, J. S., On spinor exceptional representations, Nagoya Math. J., 87 (1982), 247260.CrossRefGoogle Scholar
[ 2 ] Cassels, J. W. S., Rational Quadratic Forms, Academic Press, London, 1978.Google Scholar
[ 3 ] Cassels, J. W. S., Rationale quadratische Formen, Jber. d. Dt. Math.-Verein, 82 (1980), 8193.Google Scholar
[ 4 ] Earnest, A. G., Congruence conditions on integers represented by ternary quadratic forms, Pacific J. Math., 90 (1980), 325333.Google Scholar
[ 5 ] Hsia, J. S., Representations by spinor genera, Pacific J. Math., 63 (1976), 147152.CrossRefGoogle Scholar
[ 6 ] Jones, B. W., Exceptional ternary and binary forms, preprint.Google Scholar
[ 7 ] Jones, B. W. and Watson, G. L., On indefinite ternary quadratic forms, Canad. J. Math., 8 (1956), 188194.CrossRefGoogle Scholar
[ 8 ] Kneser, M., Darstellungsmasse indefiniter quadratischer Formen, Math. Z., 77 (1961), 188194.CrossRefGoogle Scholar
[ 9 ] O’Meara, O. T., Introduction to Quadratic Forms, Springer-Verlag, Berlin-Heidelberg-New York, 1963.CrossRefGoogle Scholar
[10] Peters, M., Darstellungen durch definite ternäre quadratische Formen, Acta Arith., 34 (1977), 5780.CrossRefGoogle Scholar
[11] Schulze-Pillot, R., Darstellung durch Spinorgeschlechter ternärer quadratischer Formen, J. Number Theory, 12 (1980), 529540.CrossRefGoogle Scholar
[12] Schulze-Pillot, R., private communication.Google Scholar
[13] Siegel, C. L., Indefinite quadratische Formen und Funktionentheorie I, Math. Ann., 124 (1951), 1754.CrossRefGoogle Scholar
[14] Watson, G. L., Integral Quadratic Forms, Cambridge University Press, Cambridge, 1960.Google Scholar