Borel map
This article defines a property that can be evaluated for a map between topological spaces. Note that the map is not assumed to be continuous
Definition
Symbol-free definition
A Borel map between two topological spaces is a map from one to the other satisfying the following equivalent conditions:
- The inverse image of every open subset is a Borel subset
- The inverse image of every closed subset is a Borel subset
- The inverse image of every Borel subset is a Borel subset