An analog of multiplier sequences for the set of totally positive sequences

Abstract

A real sequence (bk)k=0∞ is called totally positive if all minors of the infinite matrix \| bj-i \|i, j =0∞ are nonnegative (here bk=0 for k<0). In this paper, we investigate the problem of description of the set of sequences (ak)k=0∞ such that for every totally positive sequence (bk)k=0∞ the sequence (ak bk)k=0∞ is also totally positive. We obtain the description of such sequences (ak)k=0∞ in two cases: when the generating function of the sequence Σk=0∞ ak zk has at least one pole, and when the sequence (ak)k=0∞ has not more than 4 nonzero terms.