Abstract
Firstly, we determine the degree of approximation of a bivariate periodic function by double Abel–Poisson mean of its double Fourier series in the metric of a particular Zygmund’s space. Secondly, knowing that a double Fourier series has three double conjugate series, we show the degree of approximation for one of bivariate conjugate function in \(L^p\)-metric by its corresponding double Abel–Poisson means of the double conjugate series. Finally, we establish two propositions on the degree of approximation of other two double conjugate Abel–Poisson means itself (in \(L^p\)-metric) by some specific quantities.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Chandra, P. 1982. On the generalised Fejér means in the metric of Hölder space. Mathematische Nachrichten 109: 39–45.
Das, G., T. Ghosh, and B.K. Ray. 1996. Degree of approximation of functions by their Fourier series in the generalized Hölder metric. Proceedings of the Indian Academy of Sciences: Mathematical Sciences 106(2): 139–153.
G. Das, A. Nath, and B. K. Ray. 2002. An estimate of the rate of convergence of Fourier series in the generalized Hölder metric. In Analysis and applications (Ujjain, 1999), 43–60. New Delhi: Narosa.
Deǧer, U., and M. Kücükaslan. 2015. A generalization of deferred Cesàro means and some of their applications. Journal of Inequalities and Applications 2015: 1–16.
Deǧer, U. 2016. A note on the degree of approximation by matrix means in the generalized Hölder metric. Ukrainian Mathematical Journal 68: 545–556.
Değer, U. 2016. On approximation by matrix means of the multiple Fourier series in the Hölder metric. Kyungpook Mathematical Journal 56(1): 57–68.
Guven, A. 2013. Approximation by \((C,1)\) and Abel–Poisson means of Fourier series on hexagonal domains. Mathematical Inequalities & Applications 16(1): 175–191.
Guven, A. 2012. Approximation by means of hexagonal Fourier series in Hölder norms. Journal of Classical Analysis 1(1): 43–52.
Hardy, G.H., J.E. Littlewood, and G. Pólya. 1967. Inequalities. London: Cambridge University Press.
Hasegawa, Y. 1963. On summabilities of double Fourier series. Kodai Mathematical Seminar Reports 15: 226–238.
Jafarov, S.Z. 2022. Some linear processes for Fourier series and best approximations of functions in Morrey spaces. Palestine Journal of Mathematics 11(1): 613–622.
K. Khatri and V. N. Mishra 2019. Degree of approximation by the \((T.E^1)\) means of conjugate series of Fourier series in the Hölder metric. Iranian Journal of Science and Technology, Transactions of Electrical Engineering 43(4), 1591–1599.
Kim, J. 2021. Degree of approximation in the space \(H_{p}^{\omega }\) by the even-type delayed arithmetic mean of Fourier series. Georgian Mathematical Journal 28(5): 747–753.
Krasniqi, Xh.Z. 2011. On the degree of approximation by Fourier series of functions from the Banach space \(H^{(\omega )}_p, p\ge 1\), in generalized Hölder metric. International Mathematical Forum 6(13–16): 613–625.
Krasniqi, Xh.Z. 2023. Approximation of functions by superimposing of de la Vallée Poussin mean into deferred matrix mean of their Fourier series in Hölder metric with weight. Acta Mathematica Universitatis Comenianae 92(1): 35–54.
Krasniqi, Xh.Z. 2023. Effectiveness of the even-type delayed mean in approximation of conjugate functions. Journal of Contemporary Mathematical Analysis 58(5): 315–329.
Krasniqi, Xh.Z. 2020. Approximation by sub-matrix means of multiple Fourier series in the Hölder metric. Palestine Journal of Mathematics 9(2): 761–770.
Krasniqi, Xh.Z., and B. Szal. 2019. On the degree of approximation of continuous functions by means of Fourier series in the Hölder metric. Analysis in Theory and Applications 35(4): 392–404.
Krasniqi, Xh.Z., P. Korus and B. Szal. 2023. Approximation by double second type delayed arithmetic mean of periodic functions in \(H_p^{(\omega ,\omega )}\) space. Boletin de la Sociedad Matematica Mexicana (3) 29(1), Paper No. 21.
Krasniqi, Xh.Z., W. Lenski, and B. Szal. 2022. Trigonometric approximation of functions in seminormed spaces. Results in Mathematics 77(4), Paper No. 145.
Krasniqi, Xh.Z., P. Kórus, and F. Móricz. 2014. Necessary conditions for the \(L^p\)-convergence \((0<p<1)\) of single and double trigonometric series. Mathematica Bohemica 139(1): 75–88.
Lal, S., and V.N. Tripathi. 2003. On the study of double Fourier series by double matrix summability method. Tamkang Journal of Mathematics 34(1): 1–16.
Lal, S. 2011 On the approximation of function \(f(x,y)\) belonging to Lipschitz class by matrix summability method of double Fourier series. The Journal of the Indian Mathematical Society (N.S.) 78(1-4), 93–101.
Leindler, L. 1979. Generalizations of Prössdorf’s theorems. Studia Scientiarum Mathematicarum Hungarica 14(4): 431–439.
Leindler, L. 2009. A relaxed estimate of the degree of approximation by Fourier series in generalized Hölder metric. Analysis Mathematica 35(1): 51–60.
Lenski, W., U. Singh, and B. Szal. 2021. Trigonometric approximation of functions in seminormed spaces. Mathematical Inequalities & Applications 24(1): 89–101.
London, B., H. Carley, and R.N. Mohapatra. 2020. Approximation by the \(K^\lambda\) means of Fourier series and conjugate series of functions in \(H_{\alpha, p}\). Applicable Analysis and Discrete Mathematics 14(3): 800–818.
V. N. Mishra and K. Khatri. 2014. Degree of approximation of functions \({\tilde{f}}\in H_\omega\) class by the \((N_p\cdot E^1)\) means in the Hölder metric. International Journal of Mathematics and Mathematical Sciences 2014, Art. ID 837408.
Mittal, M.L., and B.E. Rhoades. 2000. Degree of approximation to functions in a normed space. Journal of Computational Analysis and Applications 2(1): 1–10.
Mohapatra, R.N., and P. Chandra. 1983. Degree of approximation of functions in the Hölder metric. Acta Mathematica Hungarica 41(1–2): 67–76.
Móricz, F., and X. Shi. 1987. Approximation to continuous functions by Cesàro means of double Fourier series and conjugate series. Journal of Approximation Theory 49: 346–377.
Móricz, F., and B.E. Rhoades. 1987. Approximation by Nörlund means of double Fourier series to continuous functions in two variables. Constructive Approximation 3(3): 281–296.
Móricz, F., and B.E. Rhoades. 1996. Approximation by weighted means of Walsh-Fourier series. International Journal of Mathematics and Mathematical Sciences 19(1): 1–8.
Móricz, F., and B.E. Rhoades. 1987. Approximation by Nörlund means of double Fourier series for Lipschitz functions. Journal of Approximation Theory 50: 341–358.
Móricz, F. 2000. Approximation by rectangular partial sums of double conjugate Fourier series. Journal of Approximation Theory 103(1): 130–150.
Mittal, M.L., and B.E. Rhoades. 1999. Approximation by matrix means of double Fourier series to continuous functions in two variables. Radovi Matematicki 9(1): 77–99.
Nayak, L., G. Das, and B.K. Ray. 2014. An estimate of the rate of convergence of Fourier series in the generalized Hölder metric by deferred Cesàro mean. Journal of Mathematical Analysis and Applications 420(1): 563–575.
L. Nayak, G. Das, and B. K. Ray. 2014. An estimate of the rate of convergence of the Fourier series in the generalized Hölder metric by delayed arithmetic mean. International Journal of Analysis, Art. ID 171675.
H. K. Nigam and Md. Hadish. 2018. Best approximation of functions in generalized Hölder class. Journal of Inequalities and Applications 2018, Paper No. 276.
Nigam, H.K., M. Mursaleen, and S. Rani. 2020. Approximation of functions in generalized Zygmund class by double Hausdorff matrix. Advances in Difference Equations 2020, Paper No. 317.
Nigam, H.K., and K.M. Sah. 2022. Characterizations of double Hausdorff matrices and best approximation of conjugate of a function in generalized Hölder space. Filomat 36(15): 5003–5028.
Pradhan, T., et al. 2019. On approximation of the rate of convergence of Fourier series in the generalized Hölder metric by deferred Nörlund mean. Afrika Matematika 30(7–8): 1119–1131.
Prössdorf, S. 1975. Zur Konvergenz der Fourierreihen hölderstetiger Funktionen. Mathematische Nachrichten 69: 7–14 (German).
A. Rathore, U. Singh. 2018. Approximation of certain bivariate functions by almost Euler means of double Fourier series. Journal of Inequalities and Application 2018, Paper No. 89.
Singh, T. 1992. Degree of approximation to functions in a normed space. Publicationes Mathematicae Debrecen 40(3–4): 261–271.
Singh, T., S.K. Jain, and P. Mahajan. 2008. Error bound of periodic signal in normed space by deferred Cesàro-transform. The Aligarh Bulletin of Mathematics 27(2): 101–107.
T. Singh and P. Mahajan 2008. Error bound of periodic signals in the Hölder metric. International Journal of Mathematics and Mathematical Sciences Art. ID 495075.
U. Singh and S. Sonker. 2012. Degree of approximation of function \(f\in H^{(w)}_p\) class in generalized Hölder metric by matrix means, Mathematical modelling and scientific computation, 1–10, Commun. Comput. Inf. Sci., 283, Springer, Heidelberg, 2012.
Sunouchi, G., and C. Watari. 1959. On the determination of the class of saturation in the theory of approximation of functions II. Tohoku Mathematical Journal 2(11): 480–488.
Sezgek, Ş, and İ Dağadur. 2019. Approximation by double Cesàro submethods of double Fourier series for Lipschitz fuctions. Palestine Journal of Mathematics 8(1): 71–85.
Srivastava, S.K., and U. Singh. 2014. Trigonometric approximation of periodic functions belonging to \(Lip(\omega (t), p)\)-class. Journal of Computational and Applied Mathematics 270: 223–230.
Xu, Y. 2010. Fourier series and approximation on hexagonal and triangular domains. Constructive Approximation 31(1): 115–138.
Zygmund, A. 2002. Trigonometric series. 3rd rev ed. Cambridge: Cambridge University Press.
Author information
Authors and Affiliations
Corresponding author
Ethics declarations
Conflict of interest
The author declares that he has no conflict of interest.
Ethical approval
This article does not contain any studies with human participants or animals performed by author.
Additional information
Communicated by S. Ponnusamy.
Publisher's Note
Springer Nature remains neutral with regard to jurisdictional claims in published maps and institutional affiliations.
Rights and permissions
Springer Nature or its licensor (e.g. a society or other partner) holds exclusive rights to this article under a publishing agreement with the author(s) or other rightsholder(s); author self-archiving of the accepted manuscript version of this article is solely governed by the terms of such publishing agreement and applicable law.
About this article
Cite this article
Krasniqi, X.Z. On approximation of bivariate functions by Abel–Poisson and conjugate Abel–Poisson means. J Anal 32, 1591–1617 (2024). https://doi.org/10.1007/s41478-023-00704-1
Received:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s41478-023-00704-1