Von Neumann entropy and majorization

We consider the properties of the Shannon entropy for two probability distributions which stand in the relationship of majorization. Then we give a generalization of a theorem due to Uhlmann, extending it to infinite dimensional Hilbert spaces. Finally we show that for any quantum channel $\Phi$, one has $S(\Phi(\rho))=S(\rho)$ for all quantum states $\rho$ if and only if there exists an isometric operator $V$ such that $\Phi(\rho)=V\rho V^*$.