Unbounded operators having self-adjoint or normal powers and some related results

Abstract

We show that a densely defined closable operator A such that the resolvent set of A2 is not empty is necessarily closed. This result is then extended to the case of a polynomial p(A). We also generalize a recent result by Sebesty\'en-Tarcsay concerning the converse of a result by J. von Neumann. Other interesting consequences are also given, one of them being a proof that if T is a quasinormal (unbounded) operator such that Tn is normal for some n≥2, then T is normal. By a recent result by Pietrzycki-Stochel, we infer that a closed subnormal operator such that Tn is normal, must be normal. Another remarkable result is the fact that a hyponormal operator A, bounded or not, such that Ap and Aq are self-adjoint for some co-prime numbers p and q, is self-adjoint. It is also shown that an invertible operator (bounded or not) A for which Ap and Aq are normal for some co-prime numbers p and q, is normal. These two results are shown using B\'ezout's theorem in arithmetic.