On the characterization of Gelfand-Shilov-Roumieu spaces

Abstract

Generalized m-Gelfand-Shilov-Roumieu vector spaces Sm(X) are introduced. Here m = (m(1),...,m(n)), X=(X1,...,Xn) and m(1),...,m(n) are sequences of positive real numbers and X1,...,Xn are operators in a Hilbert space. Conditions are given on the sequences m(1),...,m(n) and on the operators X1,...,Xn so that the equality Sm(X) = Sm(1)(X1) ... Sm(n)(Xn) is valid. As a corollary we obtain a new proof of a characterization theorem for classical Gelfand-Shilov spaces.