%I A110850
%S A110850 1,0,651,72912,1146132,564075008,57512186172,1056905938512,734330714764860,
%T A110850 53237542070899200,3985440426544029348,1018566068308173405360,44117503923016652612508,
%U A110850 8869675469814066455364096,1400650029016035400451535476,15983187713796350482010970064
%V A110850 1,0,651,72912,1146132,-564075008,-57512186172,1056905938512,734330714764860,
%W A110850 53237542070899200,-3985440426544029348,-1018566068308173405360,-44117503923016652612508,
%X A110850 8869675469814066455364096,1400650029016035400451535476,15983187713796350482010970064
%N A110850 G.f.: 16th root of weight enumerator of [64,57,4] Reed-Muller code RM(4,
               6).
%H A110850 N. Heninger, E. M. Rains and N. J. A. Sloane, <a href="http://arXiv.org/
               abs/math.NT/0509316">On the Integrality of n-th Roots of Generating 
               Functions</a>, J. Combinatorial Theory, Series A, 113 (2006), 1732-1745.
%Y A110850 Cf. A010082.
%Y A110850 Sequence in context: A043605 A151736 A010087 this_sequence A048915 A002232 
               A127029
%Y A110850 Adjacent sequences: A110847 A110848 A110849 this_sequence A110851 A110852 
               A110853
%K A110850 sign
%O A110850 0,3
%A A110850 N. J. A. Sloane (njas(AT)research.att.com) and Nadia Heninger (nadiah(AT)cs.princeton.edu) 
               Aug 18 2005