Hereditary completeness of Exponential systems \eλn t\n=1∞ in their closed span in L2 (a, b) and Spectral Synthesis

Abstract

Suppose that \λn\n=1∞ is a sequence of distinct positive real numbers satisfying the conditions inf\λn+1-λn \>0, and Σn=1∞λn-1<∞. We prove that the exponential system \eλn t\n=1∞ is hereditarily complete in the closure of the subspace spanned by \eλn t\n=1∞ in the space L2 (a,b). We also give an example of a class of compact non-normal operators defined on this closure which admit spectral synthesis.