The classical and approximate sampling theorems and their equivalence for entire functions of exponential type

It is shown that three versions of the sampling theorem of signal analysis are equivalent in the sense that each can be proved as a corollary of one of the others. The theorems in question are the sampling theorem for functions belonging to the Bernstein space B"@s^2, the sampling theorem for functions in B"@t^~, 0<@t<@s, and the approximate sampling theorem for non-bandlimited function. One essential difference to an earlier paper of two of the authors is the avoidance of the deep Paley-Wiener theorem of Fourier analysis.

[1]  J. R. Higgins,et al.  The Sampling Theorem and Several Equivalent Results in Analysis , 2000 .

[2]  R. L. Stens,et al.  Sampling theory in Fourier and signal analysis : advanced topics , 1999 .

[3]  Ralph P. Boas,et al.  OF ENTIRE FUNCTIONS , 2016 .

[4]  Paul L. Butzer,et al.  Shannon’s Sampling Theorem Cauchy’s Integral Formula, and Related Results , 1984 .

[5]  M. Nikolskii,et al.  Approximation of Functions of Several Variables and Embedding Theorems , 1971 .

[6]  F. Marvasti Nonuniform sampling : theory and practice , 2001 .

[7]  Paul L. Butzer,et al.  The Summation Formulae of Euler–Maclaurin, Abel–Plana, Poisson, and their Interconnections with the Approximate Sampling Formula of Signal Analysis , 2011 .

[8]  Paul L. Butzer,et al.  An Introduction to Sampling Analysis , 2001 .

[9]  S. Nikol,et al.  Approximation of Functions of Several Variables and Imbedding Theorems , 1975 .

[10]  Chris Bissell The sampling theorem , 2007 .

[11]  P. L. Butzer,et al.  Shannon's Sampling Theorem for Bandlimited Signals and Their Hilbert Transform, Boas-Type Formulae for Higher Order Derivatives - The Aliasing Error Involved by Their Extensions from Bandlimited to Non-Bandlimited Signals , 2012, Entropy.

[12]  K. Knopp Theory and Application of Infinite Series , 1990 .

[13]  P. Chirlian,et al.  Restrictions on the effective bandwidth of signals , 1971 .

[14]  A. Browder On Bernstein's Inequality and the Norm of Hermitian Operators , 1971 .

[15]  E. Hille Analytic Function Theory , 1961 .

[16]  Gerhard Schmeisser Numerical differentiation inspired by a formula of R.P. Boas , 2009, J. Approx. Theory.

[17]  R. L. Stens,et al.  The sampling theorem, Poisson's summation formula, general Parseval formula, reproducing kernel formula and the Paley–Wiener theorem for bandlimited signals – their interconnections , 2011 .

[18]  Q. I. Rahman,et al.  Quadrature formulae and functions of exponential type , 1990 .

[19]  A. Zayed Advances in Shannon's Sampling Theory , 1993 .

[20]  I. Mazin,et al.  Theory , 1934 .

[21]  A. Timan Theory of Approximation of Functions of a Real Variable , 1994 .

[22]  Q. I. Rahman,et al.  A quadrature formula for entire functions of exponential type , 1994 .

[23]  Paul Leo Butzer,et al.  Approximation und Interpolation durch verallgemeinerte Abtastsummen , 1977 .

[24]  Yurii Lyubarskii,et al.  Lectures on entire functions , 1996 .

[25]  P. L. Butzer,et al.  Classical and approximate sampling theorems; studies in the lP(R) and the uniform norm , 2005, J. Approx. Theory.

[26]  W. Rogosinski Fourier series , 1950 .

[27]  A. Offord Introduction to the Theory of Fourier Integrals , 1938, Nature.