References
- E. O. Brigham, The Fast Fourier Transform and its Applications, Englewood Cliffs, NJ: Prentice-Hall Inc., 1988
- N. S. Barnett and S. S. Dragomir, An approximation for the Fourier transform of absolutely continuous mappings, Proc. 4th Int. Conf. on Modelling and Simulation, Victoria University, Melbourne, 2002, 351-355. RGMIA Res. Rep. Coll. 5 (2002), Supplement, Article 33. [ONLINE: http://rgmia.vu.edu.au/v5(E).html]
- N. S. Barnett, S. S. Dragomir, and G. Hanna, Error estimates for approximating the Fourier transform of functions of bounded variation, RGMIA Res. Rep. Coll. 7 (2004), no, 1, Articla 11. [ONLINE: http://rgmia.vu.edu.au/v7n1.html]
- S. S. Dragomir, Reverses of Schwarz, triangle and Bessel inequalities in inner product spaces, RGMIA Res. Rep. Coll. 6 (2003), Supplement, Article 19, [ONLINE: http://rgmia.vu.edu.au/v6(E).html].
- S. S. Dragomir, Y. J. Cho, and S. S. Kim, An approximation for the Fourier transform of Lebesgue integrable mappings, in Fixed Point Theory and Applications, Vol. 4, Y. J. Cho, J. K. Kim, and S. M. Kong (Eds.), Nova Science Publishers Inc., 2003, pp. 67-74
- W. Greub and W. Rheinboldt, On a generalisation of an inequality of L. V. Kantorovich, Proc. Amer. Math. Soc. 10 (1959), 407-415
- G. Polya and G. Szego, Aufgaben und Lehrsatze aus der Analysis, Vol. 1, Berlin 1925, pp. 57 and 213-214
- G. S. Watson, Serial correlation in regression analysis I, Biometrika 42 (1955), 327-342 https://doi.org/10.1093/biomet/42.3-4.327
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