Some majorization problems associated with \(p\)-valently starlike and convex functions of complex order (Q2785264)

Let \(f\) and \(g\) be holomorphic in the unit disk \(\mathbb{D}\) functions. One says that \(f\) is majorized by \(g\) in \(\mathbb{D}\) if there exists a function \(\varphi\), analytic in \(\mathbb{D}\), such that \(|\varphi(z)|\leq 1\) and \(f(z)=\varphi (z)g(z)\) for \(z\in\mathbb{D}\). In the cases when \(g\) belongs to the subclass \(S_{p,q} (\gamma)\) (or subclass \(C_{p,q} (\gamma))\) of \(p\)-valent starlike (or convex) functions of complex order \(\gamma\neq 0\) it is shown that the minorant \(p\)-valent function \(f\) satisfies \(|f^{(q+1)}(z) |\leq|g^{(q+1)} (z)|\) for \(|z|\leq r\), where \(r\) depends of all parameters.