Essentially \(\lambda\)-Hankel operators (Q355811)

Summary: The notion of essentially \(\lambda\)-Hankel operators is introduced on the space \(H^2\). In addition to the discussion of some algebraic and topological properties of the set \(\text{essHank}_\lambda\), the set of all essentially \(\lambda\)-Hankel operators on \(H^2\), it is shown that an essentially Toeplitz Rhaly operator with determining sequence \(\langle a_n \rangle\) is in \(\text{essHank}_\lambda\) (\(\lambda \neq 0\)) if and only if \(\lim_{n \to \infty}(n + 1)|a_n| = 0\).