%I A110846
%S A110846 1,0,0,0,11811,0,9259824,391054336,38553650604,2265732539392,68280280699008,
%T A110846 1154069876800512,8265491604401052,143943691640103936,8466492132118562640,
%U A110846 348452128209175345152,16647456396472383280364,869712709618533274712064
%V A110846 1,0,0,0,11811,0,9259824,391054336,38553650604,2265732539392,68280280699008,
%W A110846 1154069876800512,8265491604401052,-143943691640103936,-8466492132118562640,
%X A110846 -348452128209175345152,-16647456396472383280364,-869712709618533274712064
%N A110846 G.f.: 8th root of weight enumerator of [128,64,16] Reed-Muller code RM(3,
               7).
%H A110846 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 A110846 Cf. A110845.
%Y A110846 Sequence in context: A045307 A046192 A031868 this_sequence A071519 A065701 
               A156713
%Y A110846 Adjacent sequences: A110843 A110844 A110845 this_sequence A110847 A110848 
               A110849
%K A110846 sign
%O A110846 0,5
%A A110846 N. J. A. Sloane (njas(AT)research.att.com) and Nadia Heninger (nadiah(AT)cs.princeton.edu) 
               Aug 18 2005