Lacunarity and cyclic vectors for the Backward Shift

Abstract

This article gives a description of invariant subspaces for the backward shift generated by vector valued lacunary series and by a class of lacunary power series in H2(D, X), (where X is an Hilbert space). In particular, we show that these series f in H2(D, X) are cyclic vectors if and only if the queue of Taylor coefficients \f(k), k>N\ generates the whole space X. Analogues of this result are obtained for some functions whose spectrum is a finite union of lacunary sequences and in the polydisc. In the scalar case H2, we give a criterion on the Fourier spectrum of the function to have cyclicity for any power of the backward shift.