Asymptotic boundary forms for tight Gabor frames and lattice localization domains

Abstract

We consider Gabor localization operators Gφ, defined by two parameters, the generating function φ of a tight Gabor frame \φλ\λ ∈ , parametrized by the elements of a given lattice ⊂ R2, i.e. a discrete cocompact subgroup of R2, and a lattice localization domain ⊂ R2 with its boundary consisting of line segments connecting points of . We find an explicit formula for the boundary form BF(φ,)=A R→ ∞PF(Gφ,R)R, the normalized limit of the projection functional PF(Gφ,)=Σi=0∞λi(Gφ,)(1-λi(Gφ,)), where λi(Gφ,) are the eigenvalues of the localization operators Gφ, applied to dilated domains R, R is an integer and A is the area of the fundamental domain of the lattice .