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Search: id:A060187
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| A060187 |
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Triangle read by rows: T(n,k) (1<=k<=n) given by T(s, 1) = 1, T(s, t) = T(s, s-t+1), T(s, t) = (2*t-1)*T(s-1, t) + (2*s-2*t+1)*T(s-1, t-1). |
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38
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| 1, 1, 1, 1, 6, 1, 1, 23, 23, 1, 1, 76, 230, 76, 1, 1, 237, 1682, 1682, 237, 1, 1, 722, 10543, 23548, 10543, 722, 1, 1, 2179, 60657, 259723, 259723, 60657, 2179, 1, 1, 6552, 331612, 2485288, 4675014, 2485288, 331612, 6552, 1, 1, 19673, 1756340, 21707972
(list; table; graph; listen)
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OFFSET
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1,5
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COMMENT
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Triangle related to Eulerian numbers.
Comments from Roger L. Bagula (rlbagulatftn(AT)yahoo.com), Sep 16 2008 (Start): Coefficients of the polynomials p(x,n)=(2^n*(1 - x)^(1 + n)*LerchPhi[x, -n, 1/2].
Row sums are A000165.
The quantum combinatorial levels that are symmetrical are:
1) (1+x)^n->Pascal's triangle ;{1,2,1}
2) (1+x)^(n+1)*PolyLog[x,n]/x->Eulerian numbers; {1,4,1}
3) (2^n*(1-x)^(1+n)*LerchPhi[x, -n, 1/2]-> MacMahon numbers;{1,6,1}
These "MacMahon numbers" (named after first reference author) appears to be a fundamental symmetrical level. (End)
Eulerian numbers of type B. The n-th row of this triangle is the h-vector of the simplicial complex dual to a permutohedron of type B_(n-1). For example, the permutohedron of type B_2 is an octagon whose dual, also an octagon, has f-polynomial f(x) = 1 + 8*x + 8*x^2 and h-polynomial given by (x-1)^2 + 8*(x-1) + 8 = 1 + 6*x + x^2, giving [1,6,1] as row 3 of this table (see Fomin and Reading, p.21). The corresponding triangle of f-vectors for the type B permutohedra is A145901. The Hilbert transform of the current array is A145905. [From Peter Bala (pbala(AT)toucansurf.com), Oct 26 2008]
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REFERENCES
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P. A. MacMahon, The divisors of numbers, Proc. London Math. Soc., (2) 19 (1920), 305-340; Coll. Papers II, pp. 267-302.
Ghislain R. Franssens, On a Number Pyramid Related to the Binomial, Deleham, Eulerian, MacMahon and Stirling number triangles, Journal of Integer Sequences, Vol. 9 (2006), Article 06.4.1.
G. Boros and V. H. Moll, Irresistible Integrals: Symbolics, Analysis and Experiments in the Evaluation of Integrals, Cambridge University Press, 2004. [From Peter Bala (pbala(AT)toucansurf.com), Nov 07 2008]
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LINKS
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S. Fomin, N. Reading, Root systems and generalized associahedra, Lecture notes for IAS/Park-City 2004. [From Peter Bala (pbala(AT)toucansurf.com), Oct 26 2008]
L. Liu, Y. Wang, A unified approach to polynomial sequences with only real zeros [From Peter Bala (pbala(AT)toucansurf.com), Oct 26 2008]
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FORMULA
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T(s, 2) = 3^(s-1) - s. Sum_{t=1..s} T(s, t) = 2^(s-1)*(s-1)!.
Contribution from Peter Bala (pbala(AT)toucansurf.com), Oct 26 2008: (Start)
T(n,k) = sum {i = 1..k} (-1)^(k-i)*binomial(n,k-i)*(2*i-1)^(n-1). E.g.f.: (1 - x)*exp((1 - x)*t)/(1 - x*exp(2*(1 - x)*t)) = 1 + (1 + x)*t + (1 + 6*x + x^2)*t^2/2! + ... .
The row polynomials R(n,x) satisfy R(n,x)/(1 - x)^n = sum {i = 1..inf} (2i - 1)^(n-1)*x^i. For example, row 3 gives (x + 6*x^2 + x^3)/ (1-x)^3 = x + 3^2*x^2 + 5 ^2*x^3 + 7^2*x^4 + ... . The recurrence relation R(n+1,x) = [(2*n+1)*x - 1]*R(n,x) + 2*x*(1-x)*R'(n,x) shows that the row polynomials R(n,x) have only real zeros (apply Corollary 1.2 of [Liu and Wang]).
Worpitzky-type identity: sum {k = 1..n} T(n,k)*binomial(x+k-1,n-1) = (2*x+1)^(n-1).
The non-zero alternating row sums are (-1)^(n-1)*A002436(n). (End)
exp(x)*(d/dx)^n [exp(x)/(1-exp(2x))] = R_(n+1)(exp(2x))/ (1-exp(2x))^(n+1). Compare with Example 12.3.1. in [Boros and Moll]. [From Peter Bala (pbala(AT)toucansurf.com), Nov 07 2008]
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EXAMPLE
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Triangle begins:
{1},
{1, 1},
{1, 6, 1},
{1, 23, 23, 1},
{1, 76, 230, 76, 1},
{1, 237, 1682, 1682, 237, 1},
{1, 722, 10543, 23548, 10543, 722, 1},
{1, 2179, 60657, 259723, 259723, 60657, 2179, 1},
{1, 6552, 331612, 2485288, 4675014, 2485288, 331612, 6552, 1},
{1, 19673, 1756340, 21707972, 69413294, 69413294, 21707972, 1756340, 19673, 1},
{1, 59038, 9116141, 178300904, 906923282, 1527092468, 906923282, 178300904, 9116141, 59038, 1}
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MAPLE
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Contribution from Peter Bala (pbala(AT)toucansurf.com), Oct 26 2008: (Start)
with(combinat):
T:= (n, k) -> add((-1)^(k-i)*binomial(n, k-i)*(2*i-1)^(n-1), i = 1..k):
for n from 1 to 10 do
seq(T(n, k), k = 1..n);
end do;
(End)
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MATHEMATICA
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p[x_, n_] = 2^n*(1 - x)^(1 + n)* LerchPhi[x, -n, 1/2]; Table[FullSimplify[Expand[p[x, n]]], {n, 0, 10}]; Table[CoefficientList[FullSimplify[Expand[p[x, n]]], x], {n, 0, 10}]; Flatten[%] [Roger L. Bagula (rlbagulatftn(AT)yahoo.com), Sep 16 2008]
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CROSSREFS
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Diagonals give A060188, A060189, A060190. Cf. A008292.
A000165 (row sums), A002436 (alt. row sums), A008292, A145901, A145905(Hilbert transform). [From Peter Bala (pbala(AT)toucansurf.com), Oct 26 2008]
Sequence in context: A155467 A152936 A152969 this_sequence A156139 A155863 A035348
Adjacent sequences: A060184 A060185 A060186 this_sequence A060188 A060189 A060190
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KEYWORD
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nonn,tabl,easy,nice
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AUTHOR
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N. J. A. Sloane (njas(AT)research.att.com), Mar 20 2001
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EXTENSIONS
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More terms from Vladeta Jovovic (vladeta(AT)eunet.rs), Mar 20 2001
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