Definition:Open Invariant

Definition
Let $P$ be a property whose domain is the set of all topological spaces.

Suppose that whenever $P \left({T}\right)$ holds, then so does $P \left({T'}\right)$, where:
 * $T$ and $T'$ are topological spaces
 * $\phi: T \to T'$ is a mapping from $T$ to $T'$
 * $\phi \left[{T}\right] = T'$, where $\phi \left[{T}\right]$ denotes the image of $\phi$
 * $T'$ is an open set.

Then $P$ is an open invariant.

Loosely, an open invariant is a property which is preserved in the open image of a mapping.

Also see

 * Definition:Topological Property


 * Definition:Continuous Invariant
 * Definition:Closed Invariant