Abstract
The generalized Hermite sampling uses samples from the function itself and its derivatives up to order r. In this paper, we investigate truncation error estimates for the generalized Hermite sampling series on a complex domain for functions from Bernstein space. We will extend some known techniques to derive those estimates and the bounds of Jagerman (SIAM J. Appl. Math. 14, 714–723 1966), Li (J. Approx. Theory 93, 100–113 1998), Annaby-Asharabi (J. Korean Math. Soc. 47, 1299–1316 2010), and Ye and Song (Appl. Math. J. Chinese Univ. 27, 412–418 2012) will be special cases for our results. Some examples with tables and figures are given at the end of the paper.
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Annaby, M.H., Asharabi, R.M.: Bounds for truncation and perturbation errors of nonuniform sampling series. BIT Numer. Math. (2015). doi:10.1007/s10543-015-0585-6
Annaby, M.H., Asharabi, R.M.: Error estimates associated with sampling series of the linear canonical transforms. IMA J. Numer. Anal 35, 931–946 (2015)
Annaby, M.H., Asharabi, R.M.: Computing eigenvalues of Sturm-Liouville problems by Hermite interpolations. Numer. Algor. 60, 355–367 (2012)
Annaby, M.H., Asharabi, R.M.: Truncation, amplitude and jitter errors on ℝ for sampling series derivatives. J. Approx. Theory 163, 336–362 (2011)
Annaby, M.H., Asharabi, R.M.: Error analysis associated with uniform Hermite interpolations of bandlimited functions. J. Korean Math. Soc. 47, 1299–1316 (2010)
Annaby, M.H., Asharabi, R.M.: On sinc-based method in Computing eigenvalues of boundary-value problems. SIAM J. Numer. Anal. 46, 671–690 (2008)
Annaby, M.H., Tharwat, M.M.: The Hermite interpolation approach for computing eigenvalues of Dirac systems. Math. Comput. Modelling 57, 2459–2472 (2013)
Asharabi, R.M., Al-Haddad, H.A.: Abivariate sampling series involving mixed partial derivatives. Turk. J. Math. (2016). doi:10.3906/mat-1508-13
Butzer, P.L., Splettstösser, W.: On quantization, truncation and jitter errors in the sampling theorem and its generalizations. Signal Process. 2, 101–112 (1980)
Cambanis, S.: Truncation error bounds for the cardinal sampling series of bandlimited signals. IEEE Trans. Inform. Theory IT-28, 605–612 (1982)
Chandrasekharan, K.: Classical Fourier Transforms. Springer-Verlag, Berlin (1989)
Grozev, G.R., Rahman, Q.I.: Reconstruction of entire functions from irregularly spaced sample points. Canad. J. Math. 48, 777–793 (1996)
Helms, H.D., Thomas, J.B.: Truncation error of sampling expansions. Proc. IRE 50, 179–184 (1962)
Higgins, J.R.: Sampling Theory in Fourier and Signal Analysis Foundations. Oxford University Press, Oxford (1996)
Higgins, J.R., Schmeisser, G., Voss, J.: The sampling theorem and several equivalent results in analysis. J. Comput. Anal. Appl. 2, 333–371 (2000)
Hinsen, G.: Irregular sampling of bandlimited Lp-functions. J. Approx. Theory 72, 346–364 (1993)
Jagerman, D., Fogel, L.: Some General Aspects of the Sampling Theorem. Trans. IRE It-2, 139–146 (1956)
Jagerman, D.: Bounds for truncation error of the sampling expansion. SIAM J. Appl. Math. 14, 714–723 (1966)
Kress, R.: On the general Hermite cardinal interpolation. Math. Comput. 26, 925–933 (1972)
Li, X.M.: Uniform bounds for sampling expansions. J. Approx. Theory 93, 100–113 (1998)
Linden, D.A., Abramson, N.M.: A generalization of the sampling theorem. Inform. Contr. 3, 26–31 (1960). (see also vol. 4, pp. 95–96. 1961 for correction of (1))
Piper, H.S.Jr.: Bounds for truncation error in sampling expansios of finite energy bandlimited signals. IEEE Trans. Inform. Theory IT-21, 482–485 (1975)
Rawn, M.D.: A stable nonuniform sampling expansion involving derivatives. IEEE Trans. Inform. Theory 35, 1223–1227 (1989)
Splettstösser, W., Stens, R.L., Wilmes, G.: On approximation by the interpolation series of G. Valiron. Funct. Approx. Comment. Math. 11, 39–56 (1981)
Shin, C.E.: Generalized Hermite interpolation and sampling theorem involving derivatives. Commun. Korean Math. Soc. 17, 731–740 (2002)
Tharwat, M.M., Al-Harbi, S.M.: Approximation of eigenvalues of Sturm-Liouville problems by using Hermite interpolation. Abstr. Appl. Anal. (2013). Art. ID 412028
Timan, A.F.: Theory of Approximation of Functions of a Real Variable. Pergamon, New York (1963)
Yao, K., Thomas, J.B.: On truncation error bounds for sampling representations of bandlimited signals. IEEE Trans. Aerospace Electronic Syst. AES-2, 640–647 (1966)
Ye, P., Song, Z.: Truncation and aliasing errors for Whittaker-Kotel’nikov-Shannon sampling expansion. Appl. Math. J. Chinese Univ. 27, 412–418 (2012)
Voss, J., Sampling, Irregular: Error analysis, applications and extensions. Mitt. Math. Sem. Giessen 238, 1–86 (1999)
Voss I. Abtasten, J.: Fehleranalyse, Anwendungen and Erweiterungen Doctoral Dissertation University of Erlangen–Nürnberg (1999)
Zayed, A.I., Butzer, P.L.: Lagrange interpolation and sampling theorems. In: Marvasti, F. (ed.) Nonuniform Sampling, Theory and Practice, Kluwer Academic, New York (2001)
Zayed, A.I.: Advances in Sannon’s Sampling Theorem. CRC Press Boca Raton (1993)
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Asharabi, R.M., Al-Abbas, H.S. Truncation error estimates for generalized Hermite sampling. Numer Algor 74, 481–497 (2017). https://doi.org/10.1007/s11075-016-0159-y
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DOI: https://doi.org/10.1007/s11075-016-0159-y