%I A002902 M2990 N1210
%S A002902 3,15,75,363,1767,8463,40695,193983,926943,4404939,20967075,99421371,471987255,
%T A002902 2234455839,10587573027,50060937987,236865126051,1118861842047,5288016609807,
%U A002902 24958663919367,117855045251079,555890991721203,2622994107595707
%N A002902 Number of n-step self-avoiding walks on cubic lattice.
%D A002902 N. J. A. Sloane and Simon Plouffe, The Encyclopedia of Integer Sequences, 
               Academic Press, 1995 (includes this sequence).
%D A002902 N. J. A. Sloane, A Handbook of Integer Sequences, Academic Press, 1973 
               (includes this sequence).
%D A002902 B. D. Hughes, Random Walks and Random Environments, Oxford 1995, vol. 
               1, p. 462.
%D A002902 D. S. McKenzie and C. Domb, The second osmotic virial coefficient of 
               athermal polymer solutions, Proceedings of the Physical Society, 
               92 (1967) 632-649.
%D A002902 A. M. Nemirovsky et al., Marriage of exact enumeration and 1/d expansion 
               methods: lattice model of dilute polymers, J. Statist. Phys., 67 
               (1992), 1083-1108.
%D A002902 M. F. Sykes, Self-avoiding walks on the simple cubic lattice, J. Chem. 
               Phys., 39 (1963), 410-411.
%D A002902 M. F. Sykes et al., The asymptotic behavior of selfavoiding walks and 
               returns on a lattice, J. Phys. A 5 (1972), 653-660.
%Y A002902 Equals (1/2)*A001412. Cf. A078717, A001411, A001413.
%Y A002902 Sequence in context: A007142 A151326 A063000 this_sequence A005053 A136778 
               A000266
%Y A002902 Adjacent sequences: A002899 A002900 A002901 this_sequence A002903 A002904 
               A002905
%K A002902 nonn,walk,nice
%O A002902 1,1
%A A002902 N. J. A. Sloane (njas(AT)research.att.com).