Exact essential norm of generalized Hilbert matrix operators on classical analytic function spaces

Abstract: We compute the exact value of the essential norm of a generalized Hilbert matrix operator acting on weighted Bergman spaces A p v and weighted Banach spaces H ∞ v of analytic functions, where v is a general radial weight. In particular, we obtain the exact value of the essential norm of the classical Hilbert matrix operator on standard weighted Bergman spaces A p α for p > 2 + α, α ≥ 0, and on Korenblum spaces H ∞ α for 0 < α < 1. We also cover the Hardy space H p , 1 < p < ∞, case. In the weighted Bergman spa… Show more