/math/409/ - Source

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The following is the source code for post >>>/math/409

>>310
>>406
Yup. Isomorphism is a bijection that preserves any structure we care about. For groups, it's the group structure, homeomorphisms preserve the continuity both ways, diffeomorphisms preserve both the continuity and the differentiability. Thus we would say "the notion of isomorphism for a structure" is diffeo/homeo/etc/morphism.

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