Dirichlet Spaces Associated With Locally Finite Rooted Directed Trees

Abstract

Let T=(V, E) be a leafless, locally finite rooted directed tree. We associate with T a one parameter family of Dirichlet spaces Hq~(q ≥slant 1), which turn out to be Hilbert spaces of vector-valued holomorphic functions defined on the unit disc D in the complex plane. These spaces can be realized as reproducing kernel Hilbert spaces associated with the positive definite kernel eqnarray* Hq(z, w) = Σn=0∞(1)n(q)n\,zn wn ~P eroot + Σv ∈ V Σn=0∞ (nv +2)n(nv + q+1)n\, zn wn~Pv~(z, w ∈ D), eqnarray* where V denotes the set of branching vertices of T, nv denotes the depth of v ∈ V in T, and P eroot, ~Pv~(v ∈ V) are certain orthogonal projections. We also discuss some structural properties of the operator Mz, q of multiplication by z on Hq. Further, we discuss the question of unitary equivalence of operators M(1)z and M(2)z of multiplication by z on Dirichlet spaces Hq associated with directed trees T1 and T2 respectively.