Definition:Zero Mapping/Distribution

Definition
Let $\map \DD \R$ be the test function space.

Let $\mathbf 0 \in \map {\DD'} \R$ be a distribution.

Suppose:


 * $\forall \phi \in \map \DD \R : \map {\mathbf 0} \phi = 0$

Then $\mathbf 0$ is referred to as the zero distribution.