论文信息 - Recovery of Band-Limited Functions on Locally Compact Abelian Groups from Irregular Samples

Recovery of Band-Limited Functions on Locally Compact Abelian Groups from Irregular Samples

Using the techniques of approximation and factorization of convolution operators we study the problem of irregular sampling of band-limited functions on a locally compact Abelian group G. The results of this paper relate to earlier work by Feichtinger and Gröchenig in a similar way as Kluvánek's work published in 1969 relates to the classical Shannon Sampling Theorem. Generally speaking we claim that reconstruction is possible as long as there is sufficient high sampling density. Moreover, the iterative reconstruction algorithms apply simultaneously to families of Banach spaces.

Hans G. Feichtinger | S. S. Pandey

[1] Igor Kluvánek,et al. Sampling Theorem in Abstract Harmonic Analysis , 1965 .

[2] A. Faridani. A generalized sampling theorem for locally compact abelian groups , 1994 .

[3] H. Feichtinger. A characterization of minimal homogeneous Banach spaces , 1981 .

[4] H. Feichtinger,et al. Error analysis in regular and irregular sampling theory , 1993 .

[5] H. Feichtinger. Generalized Amalgams, With Applications to Fourier Transform , 1990, Canadian Journal of Mathematics.

[6] H. Feichtinger,et al. Irregular sampling theorems and series expansions of band-limited functions , 1992 .

[7] H. Reiter. Classical Harmonic Analysis and Locally Compact Groups , 1968 .

[8] S. S. Pandey,et al. Error estimates for irregular sampling of band-limited functions on a locally compact Abelian group , 2003 .

[9] Hans G. Feichtinger,et al. Improved locality for irregular sampling algorithms , 2000, 2000 IEEE International Conference on Acoustics, Speech, and Signal Processing. Proceedings (Cat. No.00CH37100).

[10] C. Heil. An Introduction to Weighted Wiener Amalgams , 2003 .