%I A072167
%S A072167 1,2,6,24,120,720,5040,40320,362880,3628800,39916799,479001478,
%T A072167 6227012074,87177809092,1307651456625,20921799763626,355647213494682,
%U A072167 6400805686152436,121585553747301448,2430677026538811240
%N A072167 T_10(n) in the notation of Bergeron et al., u_10(n) in the notation of 
               Gessel: Related to Young tableaux of bounded height.
%D A072167 F. Bergeron and F. Gascon, Counting Young tableaux of bounded height, 
               J. Integer Sequences, Vol. 3 (2000), #00.1.7.
%D A072167 See also: I. M. Gessel, Symmetric Functions and P-Recursiveness, Journal 
               of Combinatorial Theory, Series A 53, 257-285 (1990).
%Y A072167 Cf. A052399 for T_6(n), A047890 for T_5(n), A047889 for T_4(n).
%Y A072167 Sequence in context: A152702 A072133 A154658 this_sequence A154659 A155456 
               A000142
%Y A072167 Adjacent sequences: A072164 A072165 A072166 this_sequence A072168 A072169 
               A072170
%K A072167 nonn
%O A072167 1,2
%A A072167 Jesse Carlsson (j.carlsson(AT)physics.unimelb.edu.au), Jun 29 2002