properties of the transpose operator

$T^{\prime }\in ℬ(Y^{\prime },X^{\prime })$ and $\parallel T\parallel =\parallel T^{\prime }\parallel$.

${(\lambda T)}^{\prime }=\lambda T^{\prime }$.

${(S+T)}^{\prime }=S^{\prime }+T^{\prime }$.

${(RT)}^{\prime }=T^{\prime }{R}^{\prime }$.

If $T^{-1}$ exists and $T^{-1}\in ℬ(Y,X)$ then ${(T^{\prime })}^{-1}\in ℬ(X^{\prime },Y^{\prime })$ and ${(T^{\prime })}^{-1}={(T^{-1})}^{\prime }$.

If we endow $X^{\prime }$ and $Y^{\prime }$ with the weak-* topology then $T^{\prime }:Y^{\prime }⟶X^{\prime }$ is continuous.

$T$ is an isometric isomorphism if and only if $T^{\prime }$ is an isometric isomorphism.

If $T$ is compact (http://planetmath.org/CompactOperator) then $T^{\prime }$ is also compact.

If $T^{\prime }$ is compact and $Y$ is a Banach space, then $T$ is also compact.