Weighted composition operators on function spaces (Q2912209)

Let \(H\) be a reproducing Hilbert space of analytic functions in the unit disk \(U\) such that \(H\) is invariant under multiplication by \(z\), \(1\in H\), and \(\sigma(M_z)=\overline U\). Suppose that \(f\) is an analytic self-map of the unit disk with \(\|f\|_\infty<1\) and that the composition operator \(C_f\) acts boundedly on \(H\). If \(\varphi\) is a multiplier of \(H\), \(w\) is the Denjoy-Wolff point of \(f\), and \(\varphi(w)\neq 0\), then the weighted composition operator \(C_{\Phi,f}=M_\Phi C_f\) has a nonzero fixed point in \(H\), where \(\Phi=\varphi/\varphi(w)\).