Cantor's isomorphism theorem
= Cantor's isomorphism theorem
{wiki=Cantor's_isomorphism_theorem}
Cantor's isomorphism theorem is a fundamental result in set theory that concerns the relationships between different infinite sets. More specifically, it relates to the structure of certain types of infinite sets and their cardinalities. The theorem states that: 1. **Every set can be mapped to a \\(\\sigma\\)-algebra**: A measurable space can be constructed from any set.