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Search: id:A068518
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| A068518 |
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The sequence S(n,-3,1,1), where S(r,k,t,q) is defined by Sum(0<=j<=r){combin(r+q,j)^t*B(j,k)} and B(j,k) is the j-th k-poly-Bernoulli number. |
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1
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OFFSET
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0,2
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COMMENT
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The sequence S(n,-2,1,1), n>=0, is A016269. It would be interesting to study the more general sequences S(r,-m,1,1), r=0,1,2,... for fixed m; here we consider the special cases m=3 and m=2. Finally, one can use the sum S(r,k,t,q) to discover certain recurrence relations involving poly-Bernoulli numbers. Let us note that the well known recurrence of the classical Bernoulli numbers yields S(r,1,1,1)=r+1. Let us also note that numerical experimentation suggests that S(r,-2,1,1)=S(r,-3,0,q).
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FORMULA
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S(r, -3, 1, 1)=Sum(0<=n<=r){combin(r+1, n)*[(-1)^n*Sum(0<=m<=n){(m+1)^2*Sum(0<=s<=m){(-1)^s*combin(m, s)*s^n}]}
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CROSSREFS
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Sequence in context: A125380 A126538 A125645 this_sequence A096192 A076458 A124299
Adjacent sequences: A068515 A068516 A068517 this_sequence A068519 A068520 A068521
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KEYWORD
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nonn
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AUTHOR
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Vesselin Dimitrov (avding(AT)hotmail.com), Mar 18 2002
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