Continuous Frames, Function Spaces, and the Discretization Problem

A continuous frame is a family of vectors in a Hilbert space which allows reproductions of arbitrary elements by continuous superpositions. Associated to a given continuous frame we construct certain Banach spaces. Many classical function spaces can be identified as such spaces. We provide a general method to derive Banach frames and atomic decompositions for these Banach spaces by sampling the continuous frame. This is done by generalizing the coorbit space theory developed by Feichtinger and Gröchenig. As an important tool the concept of localization of frames is extended to continuous frames. As a byproduct we give a partial answer to the question raised by Ali, Antoine, and Gazeau whether any continuous frame admits a corresponding discrete realization generated by sampling.

[1]  R. Duffin,et al.  A class of nonharmonic Fourier series , 1952 .

[2]  Calvin C. Moore,et al.  On the regular representation of a nonunimodular locally compact group , 1976 .

[3]  Charles Fefferman,et al.  Wave packets and fourier integral operators , 1978 .

[4]  H. Triebel Theory Of Function Spaces , 1983 .

[5]  Jack Peetre,et al.  Paracommutators and Minimal Spaces , 1985 .

[6]  Y. Meyer,et al.  Some New Function Spaces and Their Applications to Harmonic Analysis , 1985 .

[7]  H. Feichtinger,et al.  Banach Spaces of Distributions Defined by Decomposition Methods, I , 1985 .

[8]  A. Grossmann,et al.  Transforms associated to square integrable group representations. I. General results , 1985 .

[9]  A. Grossmann,et al.  TRANSFORMS ASSOCIATED TO SQUARE INTEGRABLE GROUP REPRESENTATION. 2. EXAMPLES , 1986 .

[10]  I. Daubechies,et al.  PAINLESS NONORTHOGONAL EXPANSIONS , 1986 .

[11]  DECOMPOSITIONS OF FUNCTIONS AS SUMS OF ELEMENTARY FUNCTIONS , 1986 .

[12]  E. Somersalo,et al.  A GENERALIZATION OF THE CALDERON-VAILLANCOURT THEOREM TO LP AND HP , 1988 .

[13]  H. Feichtinger,et al.  A unified approach to atomic decompositions via integrable group representations , 1988 .

[14]  H. Feichtinger,et al.  Banach spaces related to integrable group representations and their atomic decompositions. Part II , 1989 .

[15]  H. Feichtinger,et al.  Banach spaces related to integrable group representations and their atomic decompositions, I , 1989 .

[16]  H. Feichtinger Atomic characterizations of modulation spaces through Gabor-type representations , 1989 .

[17]  Stéphane Jaffard Propriétés des matrices « bien localisées » près de leur diagonale et quelques applications , 1990 .

[18]  K. Gröchenig Describing functions: Atomic decompositions versus frames , 1991 .

[19]  B. Torrésani Wavelets associated with representations of the affine Weyl–Heisenberg group , 1991 .

[20]  G. Weiss,et al.  Littlewood-Paley Theory and the Study of Function Spaces , 1991 .

[21]  Ingrid Daubechies,et al.  Ten Lectures on Wavelets , 1992 .

[22]  B. Torrésani Time-frequency representations : wavelet packets and optimal decomposition , 1992 .

[23]  Syed Twareque Ali,et al.  Continuous Frames in Hilbert Space , 1993 .

[24]  Gerald Kaiser,et al.  A Friendly Guide to Wavelets , 1994 .

[25]  B. Torrésani Position-frequency analyis for signals defined on spheres , 1995, Signal Process..

[26]  Margit Rr Osler,et al.  Radial Wavelets and Bessel-kingman Hypergroups , 1997 .

[27]  On the Besov-Hankel spaces , 1998 .

[28]  P. Vandergheynst,et al.  Wavelets on the 2-sphere: A group-theoretical approach , 1999 .

[29]  Karlheinz Gröchenig,et al.  Foundations of Time-Frequency Analysis , 2000, Applied and numerical harmonic analysis.

[30]  Joseph D. Lakey,et al.  Embeddings and Uncertainty Principles for Generalized Modulation Spaces , 2001 .

[31]  Deguang Han,et al.  Frames Associated with Measurable Spaces , 2003, Adv. Comput. Math..

[32]  M. Holschneider,et al.  An Interpolation Family between Gabor and Wavelet Transformations , 2003 .

[33]  Lattices of coherent states and square integrability , 2003 .

[34]  Karlheinz Gr öchenig Localization of Frames , 2004 .

[35]  Gabriele Steidl,et al.  Weighted Coorbit Spaces and Banach Frames on Homogeneous Spaces , 2004 .

[36]  K. Gröchenig Localization of Frames, Banach Frames, and the Invertibility of the Frame Operator , 2004 .

[37]  Gabriele Steidl,et al.  Coorbit Spaces and Banach Frames on Homogeneous Spaces with Applications to the Sphere , 2004, Adv. Comput. Math..

[38]  Lasse Borup,et al.  Pseudodifferential operators on a-modulation spaces , 2004 .

[39]  Massimo Fornasier,et al.  Intrinsic Localization of Frames , 2005 .

[40]  Holger Rauhut Time-Frequency and Wavelet Analysis of Functions with Symmetry Properties , 2005 .

[41]  H. Führ Abstract Harmonic Analysis of Continuous Wavelet Transforms , 2005 .

[42]  Holger Rauhut Wavelet Transforms Associated to Group Representations and Functions Invariant under Symmetry Groups , 2005, Int. J. Wavelets Multiresolution Inf. Process..

[43]  Holger Rauhut,et al.  Banach frames in coorbit spaces consisting of elements which are invariant under symmetry groups , 2005 .

[44]  A. Rahimi,et al.  CONTINUOUS FRAMES IN HILBERT SPACES , 2006 .

[45]  Karlheinz Gröchenig,et al.  Symmetry and inverse-closedness of matrix algebras and functional calculus for infinite matrices , 2006 .

[46]  Hans G. Feichtinger,et al.  Flexible Gabor-wavelet atomic decompositions for L2-Sobolev spaces , 2006 .

[47]  Symmetry of Matrix Algebras and Symbolic Calculus for Infinite Matrices , 2022 .