Sigma Functions

Sigma Functions 

entire transcendental functions introduced by K. Weierstrass in his theory of elliptic functions. The principal sigma function (there are four in all) is

where w = 2mω₁+ 2nω₂ (ω₁ and ω₂ are two numbers such that ω₁/ω₂ is not real) and m and n independently run through all positive and negative integers, other than m = n = 0. The function σ(z) has simple zeros when z = w— that is, at the vertices of the parallelograms forming a regular lattice in the z-plane. These parallelograms are obtained from the parallelogram with vertices at the points 0, 2ω₁, 2ω₂, and 2(ω₁ + ω₂) by means of translations along its sides.

The functionσ(z) can be used to determine the Weierstrass zeta function ζ(z) and the Weierstrass elliptic function ℘(z):

Let ω₃ = – ω₁ – ω₂ and ζ(ω_k) = η_K, where k = 1, 2, 3. The formulas

σ(z + 2w_k) = – σ(z) exp [2η_k(z + w_k)] k = 1, 2, 3

express the property of quasi periodicity of the function σ(z). The equations

define the three remaining sigma functions. We have σ(0) = 0 and σ_k(0) = 1, k = 1, 2, 3. The function σ(z) is odd, and the other sigma functions are even.

Any elliptic function f(z) with periods 2ω₁, and 2ω₂ can be rationally expressed in terms of sigma functions by means of the formula

where C is a constant and a₁ …, a, and b₁, …, b_r are, respectively, complete systems of zeros and poles of f(z) satisfying the condition a₁ + … + a_r = b₁ + … + b_r. Sigma functions are closely related to theta functions.

REFERENCES

Smirnov, V. I. Kurs vysshei matematiki, 8th ed., vol. 3, part 2. Moscow, 1969.
Hurwitz, A., and R. Courant. Teoriia funktsii. Moscow, 1968. (Translated from German.)
Whittaker, E. T., and G. N. Watson. Kurs sovremennogo analiza, 2nd ed., part 2. Moscow, 1963. (Translated from English.)