Ellipsoidal harmonic

In mathematics, a Lamé function, or ellipsoidal harmonic function, is a solution of Lamé's equation, a second-order ordinary differential equation. It was introduced in the paper (Gabriel Lamé 1837). Lamé's equation appears in the method of separation of variables applied to the Laplace equation in elliptic coordinates. In some special cases solutions can be expressed in terms of polynomials called Lamé polynomials.

Lamé's equation is

where A and B are constants, and ${\displaystyle \wp }$ is the Weierstrass elliptic function. The most important case is when ${\displaystyle B\wp (x)=-\kappa ^{2}\operatorname {sn} ^{2}x}$ and ${\displaystyle \kappa ^{2}=n(n+1)k^{2}}$ for an integer n and ${\displaystyle k}$ the elliptic modulus, in which case the solutions extend to meromorphic functions defined on the whole complex plane. For other values of B the solutions have branch points.

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