Extended Ces\`aro composition operators on weak Bloch-type spaces on the unit ball of a Hilbert space

Abstract

Denote by BX the unit ball of an infinite-dimensional complex Hilbert space X. Let ∈ H(BX), the space of all holomorphic functions on the unit ball BX, ∈ S(BX) the set of holomorphic self-maps of BX. Let C, : B(BX) (and B,0(BX)) Bμ(BX) (and Bμ,0(BX)) be weighted extended Ces\`aro operators induced by products of the extended Ces\`aro operator C and integral operator T. In this paper, we characterize the boundedness and compactness of C, via the estimates for the restrictions of and to a m-dimensional subspace of X for some m2. Based on these we give necessary as well as sufficient conditions for the boundednees, the (weak) compactness of C, between spaces of Banach-valued holomorphic functions weak-associated to B(BX) and Bμ(BX).