For , Bernoulli and Euler polynomials of order are defined respectively by
| 24.16.1 | ||||
| , | ||||
|
ⓘ
| ||||
| 24.16.2 | ||||
| . | ||||
|
ⓘ
| ||||
When they reduce to the Bernoulli and Euler numbers of order :
| 24.16.3 | ||||
Also for ,
| 24.16.4 | |||
| . | |||
|
ⓘ
| |||
For this and other properties see Milne-Thomson (1933, pp. 126–153) or Nörlund (1924, pp. 144–162).
| 24.16.5 | |||
| , | |||
|
ⓘ
| |||
| 24.16.6 | |||
| . | |||
|
ⓘ
| |||
For sufficiently small ,
| 24.16.7 | |||
|
ⓘ
| |||
| 24.16.8 | |||
| . | |||
|
ⓘ
| |||
Here again denotes the Stirling number of the first kind.
| 24.16.9 | |||
| . | |||
|
ⓘ
| |||
is a polynomial in of degree . (This notation is consistent with (24.16.3) when .)
Let be a primitive Dirichlet character (see §27.8). Then is called the conductor of . Generalized Bernoulli numbers and polynomials belonging to are defined by
| 24.16.10 | |||
|
ⓘ
| |||
| 24.16.11 | |||
|
ⓘ
| |||
Let be the trivial character and the unique (nontrivial) character with ; that is, , , . Then
| 24.16.12 | |||
|
ⓘ
| |||
| 24.16.13 | |||
|
ⓘ
| |||
For further properties see Berndt (1975a).
In no particular order, other generalizations include: Bernoulli numbers and polynomials with arbitrary complex index (Butzer et al. (1992)); Euler numbers and polynomials with arbitrary complex index (Butzer et al. (1994)); q-analogs (Carlitz (1954a), Andrews and Foata (1980)); conjugate Bernoulli and Euler polynomials (Hauss (1997, 1998)); Bernoulli–Hurwitz numbers (Katz (1975)); poly-Bernoulli numbers (Kaneko (1997)); Universal Bernoulli numbers (Clarke (1989)); -adic integer order Bernoulli numbers (Adelberg (1996)); -adic -Bernoulli numbers (Kim and Kim (1999)); periodic Bernoulli numbers (Berndt (1975b)); cotangent numbers (Girstmair (1990b)); Bernoulli–Carlitz numbers (Goss (1978)); Bernoulli–Padé numbers (Dilcher (2002)); Bernoulli numbers belonging to periodic functions (Urbanowicz (1988)); cyclotomic Bernoulli numbers (Girstmair (1990a)); modified Bernoulli numbers (Zagier (1998)); higher-order Bernoulli and Euler polynomials with multiple parameters (Erdélyi et al. (1953a, §§1.13.1, 1.14.1)).