Poly-Bernoulli number
In mathematics, poly-Bernoulli numbers, denoted as , were defined by M. Kaneko as
where Li is the polylogarithm. The are the usual Bernoulli numbers.
Moreover, the Generalization of Poly-Bernoulli numbers with a,b,c parameters defined as follows
where Li is the polylogarithm.
Kaneko also gave two combinatorial formulas:
where is the number of ways to partition a size set into non-empty subsets (the Stirling number of the second kind).
A combinatorial interpretation is that the poly-Bernoulli numbers of negative index enumerate the set of by (0,1)-matrices uniquely reconstructible from their row and column sums. Also it is the number of open tours by a biased rook on a board (see A329718 for definition).
The Poly-Bernoulli number satisfies the following asymptotic:[1]
For a positive integer n and a prime number p, the poly-Bernoulli numbers satisfy
which can be seen as an analog of Fermat's little theorem. Further, the equation
has no solution for integers x, y, z, n > 2; an analog of Fermat's Last Theorem. Moreover, there is an analogue of Poly-Bernoulli numbers (like Bernoulli numbers and Euler numbers) which is known as Poly-Euler numbers.
See also
[edit]- Bernoulli numbers
- Stirling numbers
- Gregory coefficients
- Bernoulli polynomials
- Bernoulli polynomials of the second kind
- Stirling polynomials
References
[edit]- ^ Khera, J.; Lundberg, E.; Melczer, S. (2021), "Asymptotic Enumeration of Lonesum Matrices", Advances in Applied Mathematics, 123 (4): 102118, arXiv:1912.08850, doi:10.1016/j.aam.2020.102118, S2CID 209414619.
- Arakawa, Tsuneo; Kaneko, Masanobu (1999a), "Multiple zeta values, poly-Bernoulli numbers, and related zeta functions", Nagoya Mathematical Journal, 153: 189–209, doi:10.1017/S0027763000006954, hdl:2324/20424, MR 1684557, S2CID 53476063.
- Arakawa, Tsuneo; Kaneko, Masanobu (1999b), "On poly-Bernoulli numbers", Commentarii Mathematici Universitatis Sancti Pauli, 48 (2): 159–167, MR 1713681
- Brewbaker, Chad (2008), "A combinatorial interpretation of the poly-Bernoulli numbers and two Fermat analogues", Integers, 8: A02, 9, MR 2373086.
- Hamahata, Y.; Masubuchi, H. (2007), "Special multi-poly-Bernoulli numbers", Journal of Integer Sequences, 10 (4), Article 07.4.1, Bibcode:2007JIntS..10...41H, MR 2304359.
- Kaneko, Masanobu (1997), "Poly-Bernoulli numbers", Journal de Théorie des Nombres de Bordeaux, 9 (1): 221–228, doi:10.5802/jtnb.197, hdl:2324/21658, MR 1469669.