Definition:Inclusion-Reversing

Definition

Let $A, B$ be sets of sets and $\phi: A \to B$ be a mapping.

Then $\phi$ is inclusion-reversing if for every pair of sets $a_1, a_2 \in A$ such that $a_1 \subseteq a_2$, we have $\phi \left({a_2}\right) \subseteq \phi \left({a_1}\right)$.

Also See

• Contravariant Functor

• When $\left({A, \subseteq}\right)$ and $\left({B, \subseteq}\right)$ are considered as partially ordered sets, an inclusion-reversing mapping can be considered as a decreasing mapping.