3.1. Finite-dimensional operators on spaces of analytic functions

Let Ω1, Ω2 be open subsets of R d 1 and R d 2 , respectively, and let A(Ω1) denote the space of real analytic functions on Ω1. We prove a Glaeser type theorem by characterizing when a composition operator Cϕ : Using this result we characterize when A(Ω1) can be embedded topologically into A(Ω2) as

## < < Ž . 1r 2 . of T s T \*T . In this paper, we will give geometric conditions on several classes of operators, including Hankel and composition operators, belonging to L L Ž1, ϱ. . Specifically, we will show that the function space characterizing the symbols of these operators is a nonseparab

Let \(H(\Omega)\) be the space of analytic functions on a complex region \(\Omega\), which is not the punctured plane. In this paper, we prove that if a sequence of automorphisms \(\left\{\varphi_{n}\right\}_{n \geqslant 0}\) of \(\Omega\) has the property that for every compact subset \(K \subset \