Entire groups generated by fractional powers of operators

Abstract

Let T be a power-bounded operator on a Banach space X. We treat the sequence of polynomials (pn;a)n 0 such that the entire group generated by the fractional power operator -(I-T)a is given by e-t(I-T)a=e-tΣn=0∞ pn;a(t)Tn, t∈ , a>0. We provide a self-contained introduction to the polynomial family (pn;a)n 0, for a∈ , whose coefficients are determined by means of a suitable recurrence relation. The sequence (n!pn;a)n 0 forms a family of Sheffer polynomials. For a>0 and t∈ , the sequence (pn;a(t))n 0 belongs to the Lebesgue sequence space 1 of absolutely summable sequences. Moreover, these polynomials are closely related to the Lévy density functions (ft,α)t>0 defined for 0<α<1. Finally, we discuss several particular cases corresponding to specific values of a∈ , as well as applications to fractional powers in the Banach algebra 1, multiplication operators, and Cesàro means.