What Does It Mean for a Function to Be Holomorphic at Infinity?

  • Context: Graduate 
  • Thread starter Thread starter quasar987
  • Start date Start date
  • Tags Tags
    Infinity
Click For Summary

Discussion Overview

The discussion centers around the concept of holomorphic functions at infinity, specifically what it means for a function to be holomorphic on the extended complex plane \(\mathbb{C} \cup \{\infty\}\). Participants explore the implications of this definition and its significance in complex analysis compared to real analysis.

Discussion Character

  • Conceptual clarification
  • Debate/contested
  • Technical explanation

Main Points Raised

  • One participant asks for clarification on the meaning of holomorphic functions at infinity.
  • Another participant states that a function \(f(z)\) is holomorphic at infinity if \(f(1/z)\) is holomorphic at 0, suggesting a relationship between the two concepts.
  • A question is raised about the lack of discussion regarding continuity and differentiability at infinity for real functions.
  • One participant argues that infinity is not part of the real line and is not considered useful in real analysis, while it is significant in complex analysis due to concepts like poles and zeroes.
  • Another participant emphasizes the importance of the compact Riemann surface \(\mathbb{C} \cup \{\infty\}\) and its utility in complex analysis.
  • A later post questions whether this concept relates to the "one point compactification" and asks for further explanation on the significance of infinity in the complex plane.
  • One participant notes that treating infinity as a genuine point allows for a more uniform discussion of meromorphic functions and their properties, including the integral around closed curves and the nature of simple poles.

Areas of Agreement / Disagreement

Participants express differing views on the relevance of infinity in real versus complex analysis. While some agree on the importance of discussing holomorphic functions at infinity in complex analysis, others question the utility of such discussions in the context of real functions. The discussion remains unresolved regarding the broader implications of these concepts.

Contextual Notes

Some participants express uncertainty about the definitions and implications of holomorphic functions at infinity, particularly in relation to real analysis. There is also a lack of consensus on the significance of infinity as a point in different mathematical contexts.

quasar987
Science Advisor
Homework Helper
Gold Member
Messages
4,796
Reaction score
32
Hi, could someone explain what it means for a function to be holomorphic on \mathbb{C}\cup \{\infty\}? More precisely, what does it mean for it to be holomorphic at \infty. Thx.
 
Physics news on Phys.org
f(z) is holomorphic at infinity if f(1/z) is holomorphic at 0. Likewise for singularities.
 
Thx shmoe!
 
Why do we never talk about continuity and differentiability at infinity for real functions?
 
because infinity is not part of the real line and not in terms of analysis a useful point to add in, whereas infinity is a very useful adjunction to the complex plane: poles and zeroes are far more important to a study of complex analysis than real analysis. That's just the way it has worked out, and is a very hand wavy explanation. Sorry.

The point is, trying again, that Cu{infinity} is a very important compact riemann surface. It is useful to add this point and talk about functions which take infinity as an admissible value in complex analytic terms and not for real things.But, of course, we do talk about such things for the extended real line, but they just aren't as useful, and therefore *you* haven't learned about them.

(You do make a large implicit generalization from what you know about to what *we* know about).
 
matt grime said:
The point is, trying again, that Cu{infinity} is a very important compact riemann surface. It is useful to add this point and talk about functions which take infinity as an admissible value in complex analytic terms and not for real things.

Is this the so-called "one point compactification" of either the complex plane or the real line? Would you also expound upon the significance of the complex characteristics of infinity (as, say, a point in the complex plane)?

TIA,
-Ben
 
Perhaps I should have said 'it has proved more useful'.

It is just useful to allow infinity as a point. what is the integral round a closed curve of a meromorphic function? the sum of the residues at the simple poles. what are simple poles? places where the function takes the value infinity with multiplicity 1. By treating infinity as a genuine point then we can start talking about things more uniformly.Any holmorphic function from Cu{infinty} to C is constant which is another way of stating that theorem that any bounded holmorphic function is constant.
 
Last edited:

Similar threads

Graduate Question about proof of Great Picard Theorem
  • · Replies 3 ·
Replies
3
Views
3K
Insights Series in Mathematics: From Zeno to Quantum Theory
  • · Replies 2 ·
Replies
2
Views
3K
Graduate Existence of a limit implies that a function can be harmonic extended
  • · Replies 1 ·
Replies
1
Views
3K
Undergrad Uniform convergence of family of functions with continuous index
  • · Replies 3 ·
Replies
3
Views
2K
Undergrad Why does the integral of sine of x^2 from - infinity to + infinity diverge?
  • · Replies 4 ·
Replies
4
Views
3K
High School Does undefined always mean infinity?
  • · Replies 15 ·
Replies
15
Views
4K
Undergrad A question about limits and infinity
  • · Replies 7 ·
Replies
7
Views
2K
Undergrad On (real) entire functions and the identity theorem
  • · Replies 2 ·
Replies
2
Views
4K
Graduate Summing over continuum and uncountable numerocities
  • · Replies 1 ·
Replies
1
Views
3K
Graduate Integral of holomorphic function in 2 variables is holomorphic
  • · Replies 7 ·
Replies
7
Views
4K