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Complex analysis

From HandWiki - Reading time: 2 min

Handwiki book24.pngComputing portal

Here is a list of articles in the Complex analysis category of the Computing portal that unifies foundations of mathematics and computations using computers. Complex analysis is the branch of mathematics investigating holomorphic functions, i.e. functions which are defined in some region of the complex plane, take complex values, and are differentiable as complex functions. Complex differentiability has much stronger consequences than usual (real) differentiability. For instance, every holomorphic function is representable as power series in every open disc in its domain of definition, and is therefore analytic. In particular, holomorphic functions are infinitely differentiable, a fact that is far from true for real differentiable functions. Most elementary functions, such as all polynomials, the exponential function, and the trigonometric functions, are holomorphic. See also : holomorphic sheaves and vector bundles.


Subcategories

This category has the following 16 subcategories, out of 16 total.

 

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Pages in category "Complex analysis"

The following 133 pages are in this category, out of 133 total.


Licensed under CC BY-SA 3.0 | Source: https://handwiki.org/wiki/Category:Complex_analysis
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