%I A037944
%S A037944 1,528,4284,147712,1025850,2261952,3225992,8785920,110787507,
%T A037944 541648800,753618228,632798208,2541064526,1703323776,4394741400,
%U A037944 14721941504,5429742318,58495803696,1487499860,151530355200
%V A037944 1,-528,-4284,147712,-1025850,2261952,3225992,-8785920,-110787507,
%W A037944 541648800,-753618228,-632798208,2541064526,-1703323776,4394741400,
%X A037944 -14721941504,-5429742318,58495803696,1487499860,-151530355200
%N A037944 Coefficients of unique normalized cusp form Delta_18 of weight 18 for 
               full modular group.
%D A037944 F. Q. Gouvea, Non-ordinary primes, Experimental Mathematics 6 195 1997.
%D A037944 H. P. F. Swinnerton-Dyer, On l-adic representations and congruences for 
               coefficients of modular forms, pp. 1-55 of Modular Functions of One 
               Variable III (Antwerp 1972), Lect. Notes Math., 350, 1973.
%H A037944 S. R. Finch, <A HREF="http://algo.inria.fr/bsolve/">Modular forms on 
               SL_2(Z)</A>
%H A037944 <a href="Sindx_Gre.html#groups_modular">Index entries for sequences related 
               to modular groups</a>
%H A037944 Experimental Mathematics, <a href="http://www.expmath.org/">Home Page</
               a>
%e A037944 q^2-528*q^4-...
%Y A037944 Cf. A000594, A027364, A037945, A037946, A037947
%Y A037944 Sequence in context: A157475 A158365 A076580 this_sequence A059465 A071236 
               A048101
%Y A037944 Adjacent sequences: A037941 A037942 A037943 this_sequence A037945 A037946 
               A037947
%K A037944 sign
%O A037944 0,2
%A A037944 N. J. A. Sloane (njas(AT)research.att.com).