0,3

S. Kitaev and T. Mansour, On multi-avoidance of generalized patterns.

a(n) = a(n - 1) + (n + 1)*a(n - 2); a(0) = a(1) = 1; E.g.f. = ( - 2*(1 + x) + e^((x*(2 + x))/2)*(2 + x*(2 + x))*(2 + Sqrt[2*e*Pi]*erf[1/Sqrt[2]]) - e^((1 + x)^2/2)*Sqrt[2*Pi]*(2 + x*(2 + x))*Erf[(1 + x)/Sqrt[2]])/2

With offset 2: number of permutations that simultaneously avoid the patterns 12-3 and 21-3, and start with 1 and end with 12. E.g.f.: exp(x+x^2/2) * {1-int[0..x, exp(-t-t^2/2) dt]} - 1.

Sequence in context: A020138 A090083 A034515 this_sequence A105723 A025234 A075308

Adjacent sequences: A059477 A059478 A059479 this_sequence A059481 A059482 A059483

nonn

Wouter Meeussen (wouter.meeussen(AT)pandora.be), Feb 15 2001