Bohr operator on opertor valued polyanalytic functions on simply connected domains

Abstract

In this article, we study the Bohr operator for the operator valued subordination class S(f) consisting of holomorphic functions subordinate to f in the unit disk D:=\z ∈ C: |z|<1\, where f:D → B(H) is holomorphic and B(H) is the algebra of bounded linear operators on a complex Hilbert space H. We establish several subordination results, which can be viewed as the analogues of a couple of interesting subordination results from scalar valued settings. We also obtain a von Neumann-type inequality for the class of self-analytic mappings of the unit disk D which fix the origin. Furthermore, we extensively study Bohr inequalities for operator valued polyanalytic functions in certain proper simply connected domains in C. We obtain Bohr radius for the operator valued polyanalytic functions of the form F(z)= Σl=0p-1 zl \, fl(z) , where f0 is subordinate to an operator valued convex biholomorphic function, and operator valued starlike biholomorphic function in the unit disk D.