Sheffer homeomorphisms of spaces of entire functions in infinite dimensional analysis

Abstract

For certain Sheffer sequences (sn)n=0∞ on C, Grabiner (1988) proved that, for each α∈[0,1], the corresponding Sheffer operator zn sn(z) extends to a linear self-homeomorphism of Eαmin( C), the Fr\'echet topological space of entire functions of order at most α and minimal type (when the order is equal to α>0). In particular, every function f∈ Eαmin( C) admits a unique decomposition f(z)=Σn=0∞ cn sn(z), and the series converges in the topology of Eαmin( C). Within the context of a complex nuclear space and its dual space ', in this work we generalize Grabiner's result to the case of Sheffer operators corresponding to Sheffer sequences on '. In particular, for ='= Cn with n2, we obtain the multivariate extension of Grabiner's theorem. Furthermore, for an Appell sequence on a general co-nuclear space ', we find a sufficient condition for the corresponding Sheffer operator to extend to a linear self-homeomorphism of Eαmin(') when α>1. The latter result is new even in the one-dimensional case.