Convergence theorems and Tauberian theorems for functions and sequences in Banach spaces and Banach lattices (Q926401)

The main purpose of the authors here is to give some generalized convergence theorems and Tauberian theorems, involving Abel means and Cesaro-means of order 1, for positive functions and sequences in Banach lattices. These results are then applied to obtain some interesting Tauberian results for various operator semigroups. Among them are mean ergodic theorems for Cesaro-mean-bounded semigroups of operators and for semigroups of positive operators. The paper begins with giving some generalized convergence theorems and Tauberian theorems in a Banach space. Their generalization is with the help of a parameter \(g\), \(g >-1\). The case \(g =1\) of their generalization is the basic special case involving the Cesaro-means of order 1 (the case of the arithmetic-means).