Does there exists any non-contractible manifold with fixed point property? – mathoverflow.net 08:27 Posted by Unknown No Comments Is there exists any non-trivial space (i.e not deformation retract onto a point) in $\mathbb R^n$ such that any continuous map from the space onto itself has a fixed point. I highly suspect that quasi ... from Hot Questions - Stack Exchange OnStackOverflow via Blogspot Share this Google Facebook Twitter More Digg Linkedin Stumbleupon Delicious Tumblr BufferApp Pocket Evernote Unknown Artikel TerkaitWhat kind of components in a computer power supply can explode loudly? – electronics.stackexchange.comIs it possible to detect or recognize mammals, fishes or any other sea creatures that swims in an ocean from a flying aircraft? – worldbuilding.stackexchange.comIs it always better to use the whole dataset to train the final model? – datascience.stackexchange.comWhat counts as "during the move" for the monk's Unarmored Movement? – rpg.stackexchange.comHow can I build a circuit to generate an equal superposition of 3 outcomes for 2 qubits? – quantumcomputing.stackexchange.comEqual superposition of 3 outcomes for 2 quibits – quantumcomputing.stackexchange.com
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