• Title of article

    Density results for Gabor systems associated with periodic subsets of the real line Original Research Article

  • Author/Authors

    Jean-Pierre Gabardo and Deguang Han، نويسنده , , Yun-Zhang Li، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2009
  • Pages
    21
  • From page
    172
  • To page
    192
  • Abstract
    The well-known density theorem for one-dimensional Gabor systems of the form View the MathML source{e2πimbxg(x−na)}m,n∈Z, where g∈L2(R)g∈L2(R), states that a necessary and sufficient condition for the existence of such a system whose linear span is dense in L2(R)L2(R), or which forms a frame for L2(R)L2(R), is that the density condition View the MathML sourceab≤1 is satisfied. The main goal of this paper is to study the analogous problem for Gabor systems for which the window function gg vanishes outside a periodic set S⊂RS⊂R which is View the MathML sourceaZ-shift invariant. We obtain measure-theoretic conditions that are necessary and sufficient for the existence of a window gg such that the linear span of the corresponding Gabor system is dense in L2(S)L2(S). Moreover, we show that if this density condition holds, there exists, in fact, a measurable set E⊂RE⊂R with the property that the Gabor system associated with the same parameters a,ba,b and the window g=χEg=χE, forms a tight frame for L2(S)L2(S).
  • Keywords
    * Riesz bases , * Subspace Gabor frames , * Density of Gabor systems , * Zak transform
  • Journal title
    Journal of Approximation Theory
  • Serial Year
    2009
  • Journal title
    Journal of Approximation Theory
  • Record number

    852633