English

Multiplication Operators on Hilbert Spaces

Functional Analysis 2024-05-24 v2

Abstract

Let SS be a subnormal operator on a separable complex Hilbert space H\mathcal H and let μ\mu be the scalar-valued spectral measure for the minimal normal extension NN of S.S. Let R(σ(S),μ)R^\infty (\sigma(S),\mu) be the weak-star closure in L(μ)L^\infty (\mu) of rational functions with poles off σ(S),\sigma(S), the spectrum of S.S. The multiplier algebra M(S)M(S) consists of functions fL(μ)f\in L^\infty(\mu) such that f(N)HH.f(N)\mathcal H \subset \mathcal H. The multiplication operator MS,fM_{S,f} of fM(S)f\in M(S) is defined MS,f=f(N)H.M_{S,f} = f(N) |_{\mathcal H}. We show that for fR(σ(S),μ),f\in R^\infty (\sigma(S),\mu), (1) MS,fM_{S,f} is invertible iff ff is invertible in M(S)M(S) and (2) MS,fM_{S,f} is Fredholm iff there exists f0R(σ(S),μ)f_0\in R^\infty (\sigma(S),\mu) and a polynomial pp such that f=pf0,f=pf_0, f0f_0 is invertible in M(S),M(S), and pp has only zeros in σ(S)σe(S),\sigma (S) \setminus \sigma_e (S), where σe(S)\sigma_e (S) denotes the essential spectrum of S.S. Consequently, we characterize σ(MS,f)\sigma(M_{S,f}) and σe(MS,f)\sigma_e(M_{S,f}) in terms of some cluster subsets of f.f. Moreover, we show that if SS is an irreducible subnormal operator and fR(σ(S),μ),f \in R^\infty (\sigma(S),\mu), then MS,fM_{S,f} is invertible iff ff is invertible in R(σ(S),μ).R^\infty (\sigma(S),\mu). The results answer the second open question raised by J. Dudziak in 1984.

Keywords

Cite

@article{arxiv.2403.12992,
  title  = {Multiplication Operators on Hilbert Spaces},
  author = {Liming Yang},
  journal= {arXiv preprint arXiv:2403.12992},
  year   = {2024}
}
R2 v1 2026-06-28T15:26:10.231Z