Complex Analysis/Singularities

This learning unit addresses singularities of complex functions. For singularities in real analysis, these are referred to as Singularity. In complex analysis, singularities hold particular significance for the value of contour integrals. With the residue theorem, we find that only the coefficients of the Laurent series preceding ${\displaystyle (z-z_{0})^{-1}}$  contribute meaningfully to the contour integral. The integration of other summands from the Laurent series results in a contribution of 0 to the contour integral. To prove this residue theorem, singularities must first be classified.

Isolated singularities are studied in the branch of mathematics known as Complex Analysis. Isolated singularities are special isolated points in the domain of a holomorphic function. Isolated singularities are classified into Singularity, poles, and essential singularities.

Let ${\displaystyle \Omega \subseteq \mathbb {C} }$  be an open subset and ${\displaystyle z_{0}\in \Omega }$ . Further, let ${\displaystyle f\colon \Omega \setminus {z_{0}}\to \mathbb {C} }$  be a holomorphic complex-valued function. Then, ${\displaystyle z_{0}}$  is called an isolated singularity of ${\displaystyle f}$ .

• Each isolated singularity belongs to one of the following three classes:
• The point ${\displaystyle z_{0}}$  is called a removable singularity if ${\displaystyle f}$  can be extended to be holomorphic on ${\displaystyle \Omega }$ . According to the Removable singularity, this is, for example, the case if ${\displaystyle f}$  is bounded in a neighborhood of ${\displaystyle z_{0}}$ .
• The point ${\displaystyle z_{0}}$  is called a pole if ${\displaystyle z_{0}}$  is not a removable singularity and there exists a natural number ${\displaystyle k}$  such that ${\displaystyle (z-z_{0})^{k}\cdot f(z)}$  has a removable singularity at ${\displaystyle z_{0}}$ . If ${\displaystyle k}$  is chosen minimally, ${\displaystyle f}$  is said to have a pole of order ${\displaystyle k}$  at ${\displaystyle z_{0}}$ .
• Otherwise, ${\displaystyle z_{0}}$  is called an essential singularity of ${\displaystyle f}$ .

The type of singularity can also be determined from the Laurent Series:

${\displaystyle \sum _{n=-\infty }^{\infty }a_{n}(z-z_{0})^{n}}$ 

of ${\displaystyle f}$  at ${\displaystyle z_{0}}$ .

A singularity is removable if and only if the principal part vanishes, i.e., ${\displaystyle a_{n}=0}$  for all negative integers ${\displaystyle n}$ .

${\displaystyle \sum _{n=-\infty }^{\infty }a_{n}(z-z_{0})^{n}}$ 

of ${\displaystyle f}$  at ${\displaystyle z_{0}}$ .

A pole of order ${\displaystyle k}$  occurs if and only if the principal part terminates after ${\displaystyle k}$  terms, i.e., ${\displaystyle a_{-k}\neq 0}$  and ${\displaystyle a_{n}=0}$  for all ${\displaystyle n<-k}$ .

An essential singularity occurs if infinitely many terms with negative exponents are nonzero.

Statements about the properties of holomorphic functions at essential singularities are made by the Great Picard theorem and, as a simpler special case, the Casorati-Weierstrass theorem.

Plot of the function ${\displaystyle \exp(1/z)}$ . It has an essential singularity at the origin (center). The hue corresponds to the complex argument of the function value, while the brightness represents its magnitude. Here, the behavior of the essential singularity varies depending on the approach (in contrast to a pole, which would appear uniformly white).

Let ${\displaystyle \Omega =\mathbb {C} }$  and ${\displaystyle z_{0}=0.}$ 

• ${\displaystyle f\colon \Omega \setminus {0}\to \mathbb {C} ,,z\mapsto {\tfrac {\sin(z)}{z}}}$  can be continuously extended to ${\displaystyle \Omega }$  by defining ${\displaystyle f(0)=1}$ . Thus, ${\displaystyle f}$  has a removable singularity at ${\displaystyle 0}$ .

• ${\displaystyle f\colon \Omega \setminus {0}\to \mathbb {C} ,,z\mapsto {\tfrac {1}{z}}}$  has a pole of order 1 at ${\displaystyle 0}$  because ${\displaystyle g(z)=z^{1}\cdot f(z)}$  can be continuously extended to ${\displaystyle \Omega }$  by defining ${\displaystyle g(0)=1}$ .

• ${\displaystyle f\colon \Omega \setminus {0}\to \mathbb {C} ,,z\mapsto \exp \left({\tfrac {1}{z}}\right)}$  has an essential singularity at ${\displaystyle 0}$  because ${\displaystyle z^{k}\exp \left({\tfrac {1}{z}}\right)}$  is unbounded as ${\displaystyle z\to 0}$  for fixed ${\displaystyle k\in \mathbb {N} }$ , or because the Laurent series at ${\displaystyle z_{0}}$  contains infinitely many nonzero terms in the principal part:

${\displaystyle f(z)=\sum _{n=0}^{\infty }{\frac {1}{n!,z^{n}}}}$ .

Eberhard Freitag, Rolf Busam: Complex Analysis 1. Springer-Verlag, Berlin, ISBN 3-540-67641-4.

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• Date: 12/26/2024