Definition:Inverse Integral Operator
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Definition
Let $T: f \to F$ be an integral operator on a function $f$.
Let there be a (unitary) operator $T^{-1}: F \to f$ such that for a given $F \left({p}\right)$ there exists a unique $f \left({x}\right)$ such that $f = T \left({f}\right)$.
Then $T^{-1}$ is the inverse integral operator of $T$.
Sources
- 1968: Peter D. Robinson: Fourier and Laplace Transforms ... (previous) ... (next): $\S 1.1$. The Idea of an Integral Transform