Iteration of composition operators on small Bergman spaces of Dirichlet series

Abstract

The Hilbert spaces Hw consisiting of Dirichlet series F(s)=Σ n = 1∞ an n -s that satisfty Σ n=1 ∞ | an |2/ wn < ∞, with \wn\n of average order j n (the j-fold logarithm of n), can be embedded into certain small Bergman spaces. Using this embedding, we study the Gordon--Hedenmalm theorem on such Hw from an iterative point of view. By that theorem, the composition operators are generated by functions of the form (s) = c0s + φ(s), where c0 is a nonnegative integer and φ is a Dirichlet series with certain convergence and mapping properties. The iterative phenomenon takes place when c0=0. It is verified for every integer j≥slant 1, real α>0 and \wn\n having average order (j+ n)α , that the composition operators map Hw into a scale of Hw' with wn' having average order ( j+1+n)α. The case j=1 can be deduced from the proof of the main theorem of a recent paper of Bailleul and Brevig, and we adopt the same method to study the general iterative step.