Authors:L. Bernal-gonzález, M. Calderón-Moreno, and J. Prado-Bassas
We characterize various kinds of cyclicity of sequences of coefficient multipliers, which are operators defined on spaces
of holomorphic functions. In the case of a single coefficient multiplier we characterize its cyclicity, which contrasts with
the fact that such operators are never supercyclic. Moreover, it is proved that for each cyclic function there is a dense
part of the linear span of its orbit all of whose vectors are cyclic.