In: Mathematica Slovaca, vol. 53, no. 4
Stanislav Jakubec
Detaily:
Rok, strany: 2003, 369 - 372
O článku:
In this paper, we consider the class number of real cyclotomic fields for a prime conductor $p$ satisfying that both $((p-1) / (2))$ and $((p-3) / (4))$ are primes. According to Schinzel's conjecture, for the polynomials $X$, $2X+1$, $4X+3$, there are infinitely many primes $p$ with this property. We investigate divisibility of the class number $hp+$.
Ako citovať:
ISO 690:
Jakubec, S. 2003. Schinzel's conjecture and divisibility of class number $hp+$. In Mathematica Slovaca, vol. 53, no.4, pp. 369-372. 0139-9918.
APA:
Jakubec, S. (2003). Schinzel's conjecture and divisibility of class number $hp+$. Mathematica Slovaca, 53(4), 369-372. 0139-9918.