Abstract
We discuss at first in this paper the Gauge equivalence among several u-linear Hamiltonian operators and present explicitly the associated Gauge transformation of Backlund type among them. We then establish the sufficient and necessary conditions for the linear superposition of the discussed u-linear operators and matrix differential operators with constant coefficients of arbitrary order to be Hamiltonian, which interestingly shows that the resulting Hamiltonian operators survive only up to the third differential order. Finally, we explore a few illustrative examples of integrable hierarchies from Hamiltonian pairs embedded in the resulting Hamiltonian operators.