Resumen de A de Montessus type convergence study for a vector-valued rational interpolation procedure of epsilon class

Avram Sidi

• In a series of recent publications of the author, three rational interpolation methods, denoted IMPE, IMMPE, and ITEA, were proposed for vector-valued functions F(z), where F : C → CN , and their algebraic properties were studied. The convergence studies of two of the methods, namely, IMPE and IMMPE, were also carried out as these methods are being applied to meromorphic functions with simple poles, and de Montessus and K¨onig type theorems for them were proved. In the present work, we concentrate on ITEA. We study its convergence properties as it is applied to meromorphic functions with simple poles and prove de Montessus and K¨onig type theorems analogous to those obtained for IMPE and IMMPE.