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In complex analysis, the open mapping theorem states that if U is a domain of the complex plane C and fU → C is a non-constant holomorphic function, then f is an open map(i.e. it sends open subsets of U to open subsets of C, and we have invariance of domain.).

The open mapping theorem points to the sharp difference between holomorphy and real-differentiability. On the real line, for example, the differentiable function f(x) = x2 is not an open map, as the image of the open interval (−1, 1) is the half-open interval [0, 1).

The theorem for example implies that a non-constant holomorphic function cannot map an open disk onto a portion of any line embedded in the complex plane. Images of holomorphic functions can be of real dimension zero (if constant) or two (if non-constant) but never of dimension 1.

Proof

Assume fU → C is a non-constant holomorphic function and U is a domain of the complex plane. We have to show that every point in f(U) is an interior point of f(U), i.e. that every point in f(U) has a neighborhood (open disk) which is also in f(U).

Consider an arbitrary w0 in f(U). Then there exists a point z0 in U such that w0f(z0). Since U is open, we can find d > 0 such that the closed disk B around z0 with radius d is fully contained in U. Consider the function g(z) = f(z)−w0. Note that z0 is a root of the function.

We know that g(z) is not constant and holomorphic. The roots of g are isolated by the identity theorem, and by further decreasing the radius of the image disk d, we can assure that g(z) has only a single root in B (although this single root may have multiplicity greater than 1).

The boundary of B is a circle and hence a compact set, on which |g(z)| is a positive continuous function, so the extreme value theorem guarantees the existence of a positive minimum e, that is, e is the minimum of |g(z)| for z on the boundary of B and e > 0.

Denote by D the open disk around w0 with radius e. By Rouché's theorem, the function g(z) = f(z)−w0 will have the same number of roots (counted with multiplicity) in B as h(z):=f(z)−w1 for any w1 in D. This is because h(z) = g(z) + (w0w1), and for z on the boundary of B, |g(z)| ≥ e > |w0w1|. Thus, for every w1 in D, there exists at least one z1 in B such that f(z1) = w1. This means that the disk D is contained in f(B).

Open Mapping Theorem - Complex Analysis, CSIR-NET Mathematical Sciences | Mathematics for IIT JAM, GATE, CSIR NET, UGC NET

Black dots represent zeros of g(z). Black annuli represent poles. The boundary of the open set U is given by the dashed line. Note that all poles are exterior to the open set. The smaller red disk is B, centered at z0.

The image of the ball Bf(B) is a subset of the image of Uf(U). Thus w0 is an interior point of f(U). Since w0 was arbitrary in f(U) we know that f(U) is open. Since U was arbitrary, the function f is open.

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FAQs on Open Mapping Theorem - Complex Analysis, CSIR-NET Mathematical Sciences - Mathematics for IIT JAM, GATE, CSIR NET, UGC NET

1. What is the Open Mapping Theorem in Complex Analysis?
Ans. The Open Mapping Theorem, also known as the Riemann Mapping Theorem, states that if a function is analytic and non-constant on a domain in the complex plane, then the image of that domain under the function is an open set.
2. What are the implications of the Open Mapping Theorem?
Ans. The Open Mapping Theorem has several important implications in complex analysis. It implies that if a function is analytic and non-constant on a domain, then it is an open mapping. This means that the function maps open sets to open sets, which is a useful property in many applications.
3. How does the Open Mapping Theorem relate to the concept of conformal mapping?
Ans. The Open Mapping Theorem is closely related to the concept of conformal mapping. Conformal mappings are analytic functions that preserve angles locally. The Open Mapping Theorem guarantees that conformal mappings are also open mappings, which means they preserve the openness of sets in the complex plane.
4. Can the Open Mapping Theorem be used to prove the Inverse Mapping Theorem?
Ans. Yes, the Open Mapping Theorem can be used to prove the Inverse Mapping Theorem in complex analysis. The Inverse Mapping Theorem states that if a function is analytic and has a non-zero derivative at a point, then it has an inverse function that is also analytic in a neighborhood of that point. The proof of the Inverse Mapping Theorem often relies on the Open Mapping Theorem.
5. Is the Open Mapping Theorem applicable to functions defined on the real line?
Ans. No, the Open Mapping Theorem is not applicable to functions defined on the real line. The theorem specifically deals with analytic functions in the complex plane. However, there is a related theorem called the Open Mapping Theorem for Banach Spaces, which deals with open mappings in the context of Banach spaces.
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