On some operator equations in the space of analytic functions and related questions (Q2861290)

Let \(D\subset {\mathbb C}\) be a starlike region with respect to the origin. The star-convolution of two functions is defined by NEWLINE\[NEWLINE (f * g)(z)= \int_0^z f(z-t)g(t)\,dt, NEWLINE\]NEWLINE where the integral is taken over the segment joining the origin and \(z\in D\). For the convolution operator \(K_f: g \mapsto f*g\) under some suitable assumptions on \(f\), authors describe operator solutions \(A\) of the equation \(AK_f=\lambda K_f A\) and cyclic vectors of \(K_f\). There is also an estimation of the norm of the inner derivation operator (commutant).