The On-Line Encyclopedia of Integer Sequences (OEIS)

Revision History for A290595 (Bold, blue-underlined text is an addition; faded, red-underlined text is a ~~deletion~~.)
Showing entries 1-10 | older changes

A290595

Triangle T(n, k) read by rows: row n gives the coefficients of the numerator polynomials of the o.g.f. of the (n+1)-th diagonal of the Sheffer triangle A286718 (|S1hat[3,1]| generalized Stirling 1), for n >= 0.
(history; published version)

#13 by Sean A. Irvine at Mon Oct 21 16:24:01 EDT 2019

STATUS

proposed

approved

#12 by Michel Marcus at Mon Oct 21 12:01:07 EDT 2019

STATUS

editing

proposed

#11 by Michel Marcus at Mon Oct 21 12:01:04 EDT 2019

LINKS

P. Peter Bala, <a href="/A112007/a112007_Bala.txt">Diagonals of triangles with generating function exp(t*F(x)).</a>

STATUS

proposed

editing

#10 by Peter Bala at Mon Oct 21 11:56:16 EDT 2019

STATUS

editing

proposed

#9 by Peter Bala at Sat Oct 19 18:01:17 EDT 2019

LINKS

P. Bala, <a href="/A112007/a112007_Bala.txt">Diagonals of triangles with generating function exp(t*F(x)).</a>

STATUS

approved

editing

#8 by Jon E. Schoenfield at Fri Nov 09 18:20:18 EST 2018

STATUS

editing

approved

#7 by Jon E. Schoenfield at Fri Nov 09 18:20:16 EST 2018

EXAMPLE

n = 3: The o.g.f. of the 4-th 4th diagonal sequence of A286718, [28, 418, 2485, ...] = A024213(n+1), n >= 0, is P(3, x) = (28 + 222*x + 147*x^2 + 8*x^3)/(1 - 3*x)^7.

STATUS

approved

editing

#6 by N. J. A. Sloane at Tue Aug 08 21:41:45 EDT 2017

STATUS

reviewed

approved

#5 by Joerg Arndt at Tue Aug 08 13:01:07 EDT 2017

STATUS

proposed

reviewed

#4 by Wolfdieter Lang at Tue Aug 08 12:21:21 EDT 2017

STATUS

editing

proposed