Operators Similar to Their Adjoints

On operators satisfying T^*(T^*2 T^2)^p T ⩾ T^*(T^2 T^*2)^p T, On a class of non-Hermitian Hamiltonians with tridiagonal matrix representation, Matrices similar to partial isometries, Some conditions on an operator implying normality, III, Operators satisfying the growth condition $\left( {G_1 } \right)$, Operators with Inverses Similar to Their Adjoints, Cylindrical first-order superintegrability with complex magnetic fields, \(N\)-site-lattice analogues of \(V(x) = \text ix^3\), Class \(wA(s,t)\) operators and quasisimilarity, Operators with Powers Essentially Similar to Those of Their Adjoints, Operators satisfying a similarity condition, Differences and commutators of idempotents in \(C^*\)-algebras, Operators with Left Inverses Similar to their Adjoints, On products of two Hermitian operators, The range of \(A^{-1} A^*\) in GL(n,C), Complete set of inner products for a discrete PT-symmetric square-well Hamiltonian, The Fuglede--Putnam theorem for \((p,k)\)-quasihyponormal operators, Generalized Hermitian operators, A remark concerning the similarity of a finite matrix A and A*, On some classes of operators. II, The numerical range of a product, On k-quasihyponormal operators II, On some classes of unbounded operators, The role of symmetric matrices in the study of general matrices, \(\omega\)-hyponormal operators. II, ON QUASI-CLASS A OPERATORS, Nonlocality of observable algebras in quasi-Hermitian quantum theory

• A Note on Normal Operators and Their Adjoints
• A Note on Operators Unitarily Equivalent To Their Adjoints
• On Hyponormal Operators