Weighted composition operators on weak holomorphic spaces and application to weak Bloch-type spaces on the unit ball of a Hilbert space

Abstract

Let E be a space of holomorphic functions on the unit ball BX of a Banach space X. In this work, we introduce a Banach structure associated to E on the linear space WE(Y) containing Y-valued holomorphic functions on BX such that w f ∈ E for every w ∈ W, a separating subspace of the dual Y' of a Banach Y. We establish the relation between the boundedness, the (weak) compactness of the weighted composition operators W,: f ·(f ) on E and W,: g ·(g ) on WE(Y) via some characterizations of the separating subspace W. As an application, via the estimates for the restrictions of and to a m-dimensional subspace of X for some m2, we characterize the properties mentioned above of W, on Bloch-type spaces Bμ(BX) of holomorphic functions on the unit ball BX of an infinite-dimensional Hilbert space as well as their the associated spaces W Bμ(BX,Y), where μ is a normal weight on BX.