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This article is cited in 5 scientific papers (total in 5 papers)
RESEARCH ARTICLE
Normal high order elements in finite field extensions based on the cyclotomic polynomials
R. Popovycha, R. Skuratovskiib a Lviv Polytechnic National University, Institute of Computer Technologies, Bandery Str., 12, Lviv, 79013, Ukraine
b Igor Sikorsky Kiev Polytechnic Institute, av. Pobedy, 03056, Kiev, Ukraine
Abstract:
We consider elements which are both of high multiplicative order and normal in extensions $F_{q^{m} } $ of the field $F_{q} $. If the extension is defined by a cyclotomic polynomial, we construct such elements explicitly and give explicit lower bounds on their orders.
Keywords:
finite field, cyclotomic polynomial, normal basis, high multiplicative order element.
Received: 02.04.2018 Revised: 10.02.2019
Citation:
R. Popovych, R. Skuratovskii, “Normal high order elements in finite field extensions based on the cyclotomic polynomials”, Algebra Discrete Math., 29:2 (2020), 241–248
Linking options:
https://www.mathnet.ru/eng/adm755 https://www.mathnet.ru/eng/adm/v29/i2/p241
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