Does there exist a continuous bijection from open n ball to closed n-ball? One with a simple argument can show that no such function exists for n=1.But, what about n>1?
Continuous bijection from open n- ball to closed n- ball
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general-topology
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3For those who arrive later, the case $n=1$ is discussed [here](http://math.stackexchange.com/questions/42308/continuous-bijection-from-0-1-to-0-1). – 2011-05-31
1 Answers
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No. This is a special case of Brouwer's theorem of invariance of domain.
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0@lhf: yes, I gathered that. – 2011-05-31