1. First Kronecker limit formula

2. Second Kronecker limit formula

3. See also

4. References

5. External links

In mathematics, the classical Kronecker limit formula describes the constant term at s = 1 of a real analytic Eisenstein series (or Epstein zeta function) in terms of the Dedekind eta function. There are many generalizations of it to more complicated Eisenstein series. It is named for Leopold Kronecker.

First Kronecker limit formula

The (first) Kronecker limit formula states that

where

• E(τ,s) is the real analytic Eisenstein series, given by

for Re(s) > 1, and by analytic continuation for other values of the complex number s.

• γ is Euler–Mascheroni constant
• τ = x + iy with y > 0.
• , with q = e^{2π i τ} is the Dedekind eta function.

So the Eisenstein series has a pole at s = 1 of residue π, and the (first) Kronecker limit formula gives the constant term of the Laurent series at this pole.

Second Kronecker limit formula

The second Kronecker limit formula states that

where

• u and v are real and not both integers.
• q = e^{2π i τ} and q^a = e^{2π i aτ}
• p = e^{2π i z} and p^a = e^{2π i az}
• 

for Re(s) > 1, and is defined by analytic continuation for other values of the complex number s.

See also

• Herglotz–Zagier function

References

• Serge Lang, Elliptic functions, {{isbn|0-387-96508-4}}
• C. L. Siegel, Lectures on advanced analytic number theory, Tata institute 1961.

External links

• Chapter0.pdf{{dead link|date=April 2014}}

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