Composition operators from logarithmic Bloch spaces to weighted Bloch spaces

Abstract

We characterize the analytic self-maps φ of the unit disk D in C that induce continuous composition operators Cφ from the log-Bloch space B( D) to μ-Bloch spaces Bμ( D) in terms of the sequence of quotients of the μ-Bloch semi-norm of the nth power of φ and the log-Bloch semi-norm (norm) of the nth power Fn of the identity function on D, where μ: D→ (0,∞) is continuous and bounded. We also obtain an expression that is equivalent to the essential norm of Cφ between these spaces, thus characterizing φ such that Cφ is compact. After finding a pairwise norm equivalent family of log-Bloch type spaces that are defined on the unit ball Bn of Cn and include the log-Bloch space, we obtain an extension of our boundedness/compactness/essential norm results for Cφ acting on B to the case when Cφ acts on these more general log-Bloch-type spaces.