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Type: Article
A generalization of a lemma of Sullivan
Abstract:
Consider an irreducible polynomial of the form f(X) = X-p - aX - b is an element of F[X] and alpha a root of f(X), where F is a field of characteristic p. In 1975, F.J. Sullivan stated a lemma that provides the trace, taken with respect to the extension F(alpha)/F, of elements of the form alpha(n), where 0 <= n <= p(2) - 1. We present a generalization of Sullivan's Lemma and provide another proof of the original lemma. We explain how computing Tr(alpha(n)) for n < p(r) can be reduced to computing the traces Tr(alpha(m)) for all m <= r(p - 1).
Consider an irreducible polynomial of the form f(X) = X-p - aX - b is an element of F[X] and alpha a root of f(X), where F is a field of characteristic p. In 1975, F.J. Sullivan stated a lemma that provides the trace, taken with respect to the extension F(alpha)/F, of elements of the form alpha(n), where 0 <= n <= p(2) - 1. We present a generalization of Sullivan's Lemma and provide another proof of the original lemma. We explain how computing Tr(alpha(n)) for n < p(r) can be reduced to computing the traces Tr(alpha(m)) for all m <= r(p - 1).
Keywords: Trace, trimonials
MSC: 12E10 (12F10)
Journal: Communications in Algebra
ISSN: 0092-7872
Year: 2012
Volume: 40
Number: 7
Pages: 2301--2308
Created: 2012-12-07 11:49:36
Modified: 2014-02-13 11:36:14
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