Adjoining Commutes with Inverting

Theorem
Let $\HH$ and $\KK$ be Hilbert spaces.

Let $\map \BB {\HH, \KK}$ be the set of bounded linear transformations from $\HH$ to $\KK$.

Let $A \in \map \BB {\HH, \KK}$ be a bounded linear transformation on $\HH$.

Let $A^{-1} \in \map \BB {\KK, \HH}$ be an inverse for $A$.

Let $A^*$ denote the adjoint of $A$.

Then $A^*$, is invertible, and:


 * $\paren {A^*}^{-1} = \paren {A^{-1} }^*$

Proof
By definition of inverse, one has $A A^{-1} = I_\KK$, where $I_\KK$ is the identity operator on $\KK$.

From Adjoint of Composition of Linear Transformations is Composition of Adjoints and Adjoint of Identity Transformation:


 * $I_\KK = {I_\KK}^* = \paren {A A^{-1} }^* = \paren {A^{-1} }^*A^*$

Similarly:


 * $I_\HH = {I_\HH}^* = \paren {A^{-1} A}^* = A^* \paren {A^{-1} }^*$

Hence, by definition of inverse:
 * $\paren {A^*}^{-1} = \paren {A^{-1} }^*$

Hence, by definition, $A^*$ is invertible.