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Título: | Polynomials of degree 4 defining units |
Palavras-chave: | Group rings Units |
Data do documento: | 2017 |
Editor: | European Mathematical Society |
Citação: | BROCHE, O.; DEL RÍO, Á. Polynomials of degree 4 defining units. Revista Matemática Iberoamericana, [S.l.], v. 33, n. 4, p. 1487-1499, 2017. |
Resumo: | If x is the generator of a cyclic group of order n then every element of the group ring Zx is the result of evaluating x at a polynomial of degree smaller than n with integral coefficients. When such an evaluation result into a unit we say that the polynomial defines a unit on order n. Marciniak and Sehgal have classified the polynomials of degree at most 3 defining units. The number of such polynomials is finite. However the number of polynomials of degree 4 defining units on order 5 is infinite and we give the full list of such polynomials. We prove that (up to a sign) every irreducible polynomial of degree 4 defining a unit on an order greater than 5 is of the form a(X4 + 1) + b(X3 + X) + (1 − 2a − 2b)X2 and obtain conditions for a polynomial of this form to define a unit. As an application we prove that if n is greater than 5 then the number of polynomials of degree 4 defining units on order n is finite and for n ≤ 10 we give explicitly all the polynomials of degree 4 defining units on order n. We also include a conjecture on what we expect to be the full list of polynomials of degree 4 defining units, which is based on computer aided calculations. |
URI: | https://www.ems-ph.org/journals/show_abstract.php?issn=0213-2230&vol=33&iss=4&rank=15&srch=searchterm%7CPolynomials+of+degree+4+defining+units http://repositorio.ufla.br/jspui/handle/1/36522 |
Aparece nas coleções: | DEX - Artigos publicados em periódicos |
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