Verifying Two Conjectures on Generalized Elite Primes
نویسندگان
چکیده
A prime number p is called b-elite if only finitely many generalized Fermat numbers Fb,n = b 2 + 1 are quadratic residues modulo p. Let p be a prime. Write p − 1 = 2h with r ≥ 0 and h odd. Define the length of the b-Fermat period of p to be the minimal natural number L such that Fb,r+L ≡ Fb,r (mod p). Recently Müller and Reinhart derived three conjectures on b-elite primes, two of them being the following. (1) For every natural number b > 1 there is a b-elite prime. (2) There are generalized elite primes with elite periods of arbitrarily large lengths. We extend Müller and Reinhart’s observations and computational results to further support above two conjectures. We show that Conjecture 1 is true for b ≤ 1013 and that for every possible length 1 ≤ L ≤ 40 there actually exists a generalized elite prime with elite period length L.
منابع مشابه
On Generalized Elite Primes
A prime number p is called b-elite if only finitely many generalized Fermat numbers Fb,n = b 2 + 1 are quadratic residues to p. So far, only the case b = 2 was subjected to theoretical and experimental researches by several authors. Most of the results obtained for this special case can be generalized for all bases b > 2. Moreover, the generalization allows an insight to more general structures...
متن کاملRamanujan and Labos Primes, Their Generalizations, and Classifications of Primes
We study the parallel properties of the Ramanujan primes and a symmetric counterpart, the Labos primes. Further, we study all primes with these properties (generalized Ramanujan and Labos primes) and construct two kinds of sieves for them. Finally, we give a further natural generalization of these constructions and pose some conjectures and open problems.
متن کاملOn the Associated Primes of the generalized $d$-Local Cohomology Modules
The first part of the paper is concerned to relationship between the sets of associated primes of the generalized $d$-local cohomology modules and the ordinary generalized local cohomology modules. Assume that $R$ is a commutative Noetherian local ring, $M$ and $N$ are finitely generated $R$-modules and $d, t$ are two integers. We prove that $Ass H^t_d(M,N)=bigcup_{Iin Phi} Ass H^t_I(M,N)...
متن کاملOn the critical group of the n-cube
Reiner proposed two conjectures about the structure of the critical group of the n-cube Qn. In this paper we confirm them. Furthermore we describe its p-primary structure for all odd primes p. The results are generalized to Cartesian product of complete graphs Kn1 × · · · × Knk by Jacobson, Niedermaier and Reiner. © 2003 Published by Elsevier Science Inc.
متن کاملA Note on Artinian Primes and Second Modules
Prime submodules and artinian prime modules are characterized. Furthermore, some previous results on prime modules and second modules are generalized.
متن کامل