C*-submodule preserving module mappings on Hilbert C*-modules

Let $A$ be a (non-unital, in general) C*-algebra with center $Z(M(A))$ of its multiplier algebra, and let $X$ be a full Hilbert $A$-module. Then any injective bounded module morphism $T$, for which every norm-closed $A$-submodule of $X$ is invariant, is of the form $T=c \cdot {\rm id}_X$ where $c \in Z(M(A))$. The same is true if the restriction to be norm-closed is dropped. At the other extrem, for two given strongly Morita equivalent C*-algebras $A$ and $B$ and an $A$-$B$ equivalence bimodule $X$, for any two two-sided norm-closed ideals $I \in A$, $J \in B$, any (norm-closed) $I$-$J$ subbimodule of $X$ is invariant for any left bounded $B$-module operator and any right bounded $A$-module operator. So these subsets of submodules of $X$ cannot rule out any bounded module operator as a non-preserver of that subset collection, however this subset collection is preserved by any bounded module operator on $X$.