%I A027755
%S A027755 5,7,11,17,47,61,137,277,311,347,467,557,761,997,1061,1487,1811,
%T A027755 2357,2657,3911,4561,5261,5407,5857,6011,6977,7487,8377,8747,9511,
%U A027755 11777,12437,13577,14767,16007,17827,18637,18911,21467,23567,25127
%N A027755 Primes of form n^2 + n + 5.
%C A027755 a(5) through a(14) are identical to the first 10 values of q, the left-hand 
               column of "Example 2.3. We give examples of maximal and minimal elliptic 
               curves over finite fields over F_q with discriminant -19 for all 
               q < 1000.", p.4, and "Example 5.2. We produce examples of optimal 
               curves over finite fields with discriminant -19." pp.10-11 of E. 
               Alekseenko, et al. [From Jonathan Vos Post (jvospost3(AT)gmail.com), 
               Feb 12 2009]
%H A027755 P. De Geest, <a href="http://www.worldofnumbers.com/index.html">World!Of 
               Numbers</a>
%H A027755 E. Alekseenko, S. Aleshnikov, N. Markin and A. Zaytsev, <a href="http:/
               /arxiv.org/abs/0902.1901">Optimal Curves of Genus 3 over Finite Fields 
               with Discriminant -19</a>, Feb 11, 2009. [From Jonathan Vos Post 
               (jvospost3(AT)gmail.com), Feb 12 2009]
%Y A027755 Sequence in context: A046140 A023241 A106954 this_sequence A089785 A118386 
               A116641
%Y A027755 Adjacent sequences: A027752 A027753 A027754 this_sequence A027756 A027757 
               A027758
%K A027755 nonn
%O A027755 1,1
%A A027755 Patrick De Geest (pdg(AT)worldofnumbers.com)