Bürmann-Lagrange series

Lagrange series

A power series which offers a complete solution to the problem of local inversion of holomorphic functions. In fact, let a function of the complex variable be regular in a neighbourhood of the point , and let and . Then there exists a regular function in some neighbourhood of the point of the -plane which is the inverse to and is such that . Moreover, if is any regular function in a neighbourhood of the point , then the composite function can be expanded in a Bürmann–Lagrange series in a neighbourhood of the point

(*)

The inverse of the function is obtained by setting .

The expansion (*) follows from Bürmann's theorem [1]: Under the assumptions made above on the holomorphic functions and , the latter function may be represented in a certain domain in the -plane containing in the form

where

Here is a contour in the -plane which encloses the points and , and is such that if is any point inside , then the equation has no roots on or inside other than the simple root .

The expansion (*) for the case was obtained by J.L. Lagrange .

If the derivative has a zero of order at the point , there is the following generalization of the Bürmann–Lagrange series for the multi-valued inverse function [3]:

Another generalization (see, for example, [4]) refers to functions regular in an annulus; instead of the series (*), one obtains a series with positive and negative powers of the difference .

References

Comments

There is an exhaustive treatment of the Lagrange–Bürmann theorem and series in [a1].

References