On operators which are adjoint to each other

Abstract

Given two linear operators S and T acting between Hilbert spaces H and K, respectively K and H which satisfy the relation equation* Sh, k= h, Tk, h∈ S, \ k∈ T, equation* i.e., according to the classical terminology of M.H. Stone, which are adjoint to each other, we provide necessary and sufficient conditions in order to ensure the equality between the closure of S and the adjoint of T. A central role in our approach is played by the range of the operator matrix MS, T=pmatrix 1 S & -T S & 1 T pmatrix. We obtain, as consequences, several results characterizing skewadjointness, selfadjointness and essential selfadjointness. We improve, in particular, the celebrated selfadjointness criterion of J. von Neumann.