On decompositions of Banach spaces into a sum of operator ranges

It is proved that a separable Banach space X admits a representation X = X₁ + X₂ as a sum (not necessarily direct) of two infinite-codimensional closed subspaces X₁ and X₂ if and only if it admits a representation X = A₁(Y₁) + A₂(Y₂) as a sum (not necessarily direct) of two infinite-codimensional operator ranges. Suppose that a separable Banach space X admits a representation as above. Then it admits a representation X = T₁(Z₁) + T₂(Z₂) such that neither of the operator ranges T₁(Z₁), T₂(Z₂) contains an infinite-dimensional closed subspace if and only if X does not contain an isomorphic copy of l₁.