Search: id:A000261 Results 1-1 of 1 results found. %I A000261 M2949 N1189 %S A000261 0,1,3,13,71,465,3539,30637,296967,3184129,37401155,477471021, %T A000261 6581134823,97388068753,1539794649171,25902759280525,461904032857319, %U A000261 8702813980639617,172743930157869827,3602826440828270029 %N A000261 a(n) = n*a(n-1) + (n-3)*a(n-2). %C A000261 With offset 1, permanent of (0,1)-matrix of size n X (n+d) with d=3 and n zeros not on a line. This is a special case of Theorem 2.3 of Seok-Zun Song et al. Extremes of permanents of (0,1)-matrices, p. 201-202. - Jaap Spies (j.spies(AT)hccnet.nl), Dec 12 2003 %D A000261 N. J. A. Sloane and Simon Plouffe, The Encyclopedia of Integer Sequences, Academic Press, 1995 (includes this sequence). %D A000261 N. J. A. Sloane, A Handbook of Integer Sequences, Academic Press, 1973 (includes this sequence). %D A000261 Brualdi, Richard A. and Ryser, Herbert J., Combinatorial Matrix Theory, Cambridge NY (1991), Chapter 7. %D A000261 J. Riordan, An Introduction to Combinatorial Analysis, Wiley, 1958, p. 188. %D A000261 Seok-Zun Song et al., Extremes of permanents of (0,1)-matrices, Lin. Algebra and its Applic. 373 (2003), p. 197-210. %H A000261 T. D. Noe, Table of n, a(n) for n=1..102 %F A000261 E.g.f.: e^(-x) (1 - x )^(-4). %F A000261 (1/6)*Sum_{k=0..n} (-1)^k*(n-k+1)*(n-k+2)*(n-k+3)*n!/k! = (1/6)*(A000166(n)+3*A000166(n+1)+3*A000166(n+2)+A00\ 0166(n+3)). - Vladeta Jovovic (vladeta(AT)eunet.rs), Jan 07 2003 %F A000261 a(n) = round( GAMMA(n)*(n^3+6*n^2+8*n+1)*exp(-1)/6 ) for n>0 [From Mark van Hoeij (hoeij(AT)math.fsu.edu), Nov 11 2009] %Y A000261 Cf. A000255, A000153, A001909, A001910, A090010, A055790, A090012-A090016. %Y A000261 Sequence in context: A126390 A003319 A158882 this_sequence A111140 A137983 A059032 %Y A000261 Adjacent sequences: A000258 A000259 A000260 this_sequence A000262 A000263 A000264 %K A000261 nonn,new %O A000261 1,3 %A A000261 N. J. A. Sloane (njas(AT)research.att.com). %E A000261 More terms from Vladeta Jovovic (vladeta(AT)eunet.rs), Jan 07 2003 Search completed in 0.001 seconds