On overconvergent subsequencs of closed to rows classical Pade' approximants

Abstract

Let f be a power series with positive radius of convergence. In the present paper, we study the phenomenon of overconvergence of sequences of classical Pade' approximants pin,mn associated with f, where m(n)<=m(n+1)<=m(n) and m(n) = o(n/ n), resp. m(n) = 0(n) as n is going to infiity. We extend classical results by J. Hadamard and A. A. Ostrowski related to overconvergent Taylor polynomials, as well as results by G. Lo'pez Lagomasino and A. Ferna'ndes Infante concerning overconvergent subsequences of a fixed row of the Pade' table.