Rational functions as new variables

Abstract

In multicentric calculus one takes a polynomial p with distinct roots as a new variable and represents complex valued functions by Cd-valued functions, where d is the degree of p. An application is e.g. the possibility to represent a piecewise constant holomorphic function as a convergent power series, simultaneously in all components of |p(z)| . In this paper we study the necessary modifications needed, if we take a rational function r=p/q as the new variable instead. This allows to consider functions defined in neighborhoods of any compact set as opposed to the polynomial case where the domains |p(z)| are always polynomially convex. Two applications are formulated. One giving a convergent power series expression for Sylvester equations AX-XB =C in the general case of A,B being bounded operators in Banach spaces with distinct spectra. The other application formulates a K-spectral result for bounded operators in Hilbert spaces.