Abstract
Purpose: Our aim in this paper is to study generalized composition operators on alpha-Bloch and Q(K,omega)(p, q) spaces.
Methods: By the help of generalized composition operators, we act between several classes of weighted function spaces. Some important results obtained by using modified Nevanlinna counting function.
Results: The boundedness and compactness of the generalized composition operator C-phi(g) acting between two different Mobius invariant spaces Q(K1) (p, q) and Q(K2) (p, q) are studied.
Conclusions: Our results in this paper extend, generalize and improve a lot of previous results.