![complex analysis - if $f(z)$ is continuous on the compact set $\Omega$, then $|f(z)|$ attains its maximum in $\Omega$ - Mathematics Stack Exchange complex analysis - if $f(z)$ is continuous on the compact set $\Omega$, then $|f(z)|$ attains its maximum in $\Omega$ - Mathematics Stack Exchange](https://i.stack.imgur.com/1nR5f.jpg)
complex analysis - if $f(z)$ is continuous on the compact set $\Omega$, then $|f(z)|$ attains its maximum in $\Omega$ - Mathematics Stack Exchange
![PDF) A Converse To Continuous On A Compact Set Implies Uniform Continuity | Matt Hales - Academia.edu PDF) A Converse To Continuous On A Compact Set Implies Uniform Continuity | Matt Hales - Academia.edu](https://0.academia-photos.com/attachment_thumbnails/37271603/mini_magick20190303-15245-q60jn1.png?1551680292)
PDF) A Converse To Continuous On A Compact Set Implies Uniform Continuity | Matt Hales - Academia.edu
![real analysis - Topology of Space of continuous functions with compact support - Mathematics Stack Exchange real analysis - Topology of Space of continuous functions with compact support - Mathematics Stack Exchange](https://i.stack.imgur.com/LHfjE.jpg)
real analysis - Topology of Space of continuous functions with compact support - Mathematics Stack Exchange
![SOLVED: (a) Give an example of a continuous function and compact set such that f^(-1)(A) is not compact. (b) Give an example of a continuous function and connected set A such that SOLVED: (a) Give an example of a continuous function and compact set such that f^(-1)(A) is not compact. (b) Give an example of a continuous function and connected set A such that](https://cdn.numerade.com/ask_images/680e7fb4e3bd42c99b1c82d6e066a83f.jpg)
SOLVED: (a) Give an example of a continuous function and compact set such that f^(-1)(A) is not compact. (b) Give an example of a continuous function and connected set A such that
![SOLVED: Definition: Suppose (X, dx) and (Y, dy) are metric spaces and X is compact. Let C(X, Y) be the set of all continuous functions from X into Y and let D : SOLVED: Definition: Suppose (X, dx) and (Y, dy) are metric spaces and X is compact. Let C(X, Y) be the set of all continuous functions from X into Y and let D :](https://cdn.numerade.com/ask_images/94f230ab52244c259491adcb8e9625c7.jpg)
SOLVED: Definition: Suppose (X, dx) and (Y, dy) are metric spaces and X is compact. Let C(X, Y) be the set of all continuous functions from X into Y and let D :
![PDF) Uniform approximation of continuous functions on compact sets by biharmonic and bisuperharmonic functions in a biharmonic space PDF) Uniform approximation of continuous functions on compact sets by biharmonic and bisuperharmonic functions in a biharmonic space](https://i1.rgstatic.net/publication/265491749_Uniform_approximation_of_continuous_functions_on_compact_sets_by_biharmonic_and_bisuperharmonic_functions_in_a_biharmonic_space/links/54a676f00cf256bf8bb517ef/largepreview.png)