Eisenstein–Kronecker number

Template:Short description In mathematics, Eisenstein–Kronecker numbers are an analogue for imaginary quadratic fields of generalized Bernoulli numbers.^[1][2][3] They are defined in terms of classical Eisenstein–Kronecker series, which were studied by Kenichi Bannai and Shinichi Kobayashi using the Poincaré bundle.^[3][4]

Eisenstein–Kronecker numbers are algebraic and satisfy congruences that can be used in the construction of two-variable p-adic L-functions.^[3][5] They are related to critical L-values of Hecke characters.^[1][5]

When Template:Mvar is the area of the fundamental domain of ${\displaystyle \mathrm{\Gamma }}$ divided by ${\displaystyle \pi }$, where ${\displaystyle \mathrm{\Gamma }}$ is a lattice in ${\displaystyle ℂ}$:^[5] $${\displaystyle e_{a,b}^{*}(z_0,w_0):=\sum _{\gamma \in \mathrm{\Gamma }\setminus \{-z_0\}}\frac{(\overline{z_0}+\overline{\gamma }{)}^a}{(z_0+\gamma {)}^b}⟨\gamma ,w_0{⟩}_{\mathrm{\Gamma }},}$$ when ${\displaystyle {\mathbb{N}}_0:=\mathbb{N}\cup \{0\},\{a,b\in {\mathbb{N}}_0:b>a+2\},z_0,w_0\in ℂ,}$
where ${\displaystyle ⟨z,w{⟩}_{\mathrm{\Gamma }}:=e^{\frac{z\bar{w}-w\bar{z}}{A}}}$ and ${\displaystyle \bar{z}}$ is the complex conjugate of Template:Mvar.

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