Pregled bibliografske jedinice broj: 1028471
Diophantine quadruples in Z[i][X]
Diophantine quadruples in Z[i][X] // 31st Journées Arithmétiques, Book of Abstracts
Istanbul, Turska, 2019. str. 39-39 (predavanje, međunarodna recenzija, sažetak, znanstveni)
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Naslov
Diophantine quadruples in Z[i][X]
Autori
Filipin, Alan ; Jurasić, Ana
Vrsta, podvrsta i kategorija rada
Sažeci sa skupova, sažetak, znanstveni
Izvornik
31st Journées Arithmétiques, Book of Abstracts
/ - , 2019, 39-39
Skup
31st Journées Arithmétiques
Mjesto i datum
Istanbul, Turska, 01.07.2019. - 05.07.2019
Vrsta sudjelovanja
Predavanje
Vrsta recenzije
Međunarodna recenzija
Ključne riječi
Diophantine m-tuples
Sažetak
A set {;a_1, ..., a_m}; of m positive integers is called a Diophantine m-tuple, if the product of any of its two distinct elements increased by 1 is a perfect square. One of the obvious and most interesting questions is how large those sets can be. Very recently, the folklore conjecture, that there does not exist a Diophantine quintuple, was solved by He, Togbe and Ziegler. There is also a stronger version of that conjecture, which is still open, that states that every triple can be extended to quadruple with a larger element in a unique way. In this talk we will consider one of the generalization of this problem, considering such sets in the ring Z[i][X] instead of Z. More precisely, we prove that if {;a, b, c, d}; is a set of four non-zero polynomials from Z[i][X], not all constant, such that the product of any two of its distinct elements increased by1is a square of a polynomial from Z[i][X], then (a+b−c−d)^2=4(ab+1)(cd+1). This result obviously implies that we cannot have 5 polynomials form Z[i][X] with above mentioned property.
Izvorni jezik
Engleski
Znanstvena područja
Matematika