Definition:Integral Transform/Image Space

Definition
Let $\map F p$ be an integral transform:


 * $\map F p = \ds \int_a^b \map f x \map K {p, x} \, \mathrm d x$

Let $T: f \to F$ be the integral operator corresponding to $\map F p$.

The domain of $p$ is known as the image space of $T$.

Also known as
The image space of $T$ can also be seen hyphenated: image-space.