On majorization and range inclusion of operators on Hilbert C*-modules
Abstract
It is proved that for adjointable operators A and B between Hilbert C*-modules, certain majorization conditions are always equivalent without any assumptions on R(A*), where A* denotes the adjoint operator of A and R(A*) is the norm closure of the range of A*. In the case that R(A*) is not orthogonally complemented, it is proved that there always exists an adjointable operator B whose range is contained in that of A, whereas the associated equation AX=B for adjointable operators is unsolvable.
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