Abstract
In this paper some results obtained in last years on approximation theory of functions of real variables as well as complex variables are introduced.
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References
Nikol’skii, S.M., On the approximation of functions in the mean by trigonometric polynomials, Izv. Akad. Nauk SSR Ser. Mat. 10 (1946), 207–256 (Russian)
Stechkin, S.B. and Teliakovski, S.A., Approximation of differential functions by trigonometric polynomials in metric L, Trudy Mat. Inst. Steklov 88 (1967), 20–29 (Russian)
Motoruye, V.P., Approximation of periodic functions in the mean by trigonometric polynomials. Mat. Zametki 16 (1974), 15–26 (Russian)
Sun, Yong-shen, Approximation of periodic functions in the mean by linear positive operators, Acta Math. Sinica (to appear)
Baskakov, V.A., The degree of approximation of differential functions by linear polynomial operators. Theory of approximation of functions and its applications, Nauka, 1977, 28–29 (Russian)
Wang, Si-lei, Fourier series for the class of BMO functions. Initial issue (1981), 57–59 (Chinese)
Xie, Ting-fan, On the approximation of differential functions by Vallee-Poussin sums. Acta Math. Sinica 24:5 (1981), 689–693 (Chinese)
Oskolkov K.I., A Lebesgue constant in uniform metric. Mat. Zamatki 25:4 (1979), 551–555 (Russian)
Damen, V., On best approximation and Vallee-Poussin sums. Mat. Zamatki 23:5 (1978), 671–651 (Russian)
Sun, Yong-sheng, A note on Oskolkov’s inequality, Beijing Shifandaxue Xuelao; Nat. Sci. (1979) No. 3, 7–15 (Chinese)
Shi, Yan-liang, On the linear approximation of periodic functions by the subsequences of Fourier series (to appear in Advances of Math.) (Chinese)
Stechkin S.B., Approximation of periodic functions by Fejér’s summation. Trudy Mat. Inst. Steklov 62 (1961), 48–60 (Russian)
Huang, Xin-hua, Approximation of continuous functions by linear positive sum of Fourier series. Advances in Math. 8:3 (1965), 322–325 (Chinese)
Sun, Yong-sheng, The exact constant of approximation for Cesaro operators, 24:4 (1981), 516–537 (Chinese)
Sun, Yong-sheng, On the Jackson’s inequality, Beijing Shifandanue Xuebao, Nat. Sci. 1 (1981), 1–6 (Chinese)
Dudas, V.U. “Problem of the theory of approximation of functions and its applications”, Akad. Nauk Ukrain SSR, Kiev 1976, 109–125
Liang, Xue-zhang, Properly posed nodes for bivariate interpolation and the superposed interpolation. Acta Sci. Natur. Univ. Jilinensis 1 (1979), 27–32 (Chinese)
Liang, Xue-zhang, Two-dimensional quartic spline interpolation and the finite element method. Journal of Kirin Univ. Natur. Sci. edi. 1 (1978), 85–95 (Chinese)
Liang Xue-zhang, The polynomials with least deviation from zero in some multidimensional region; Math. Num. Sinica 1–2 (1977), 189–193 (Chinese)
Huang, Kun-yang, Some problems about the approximation of multiple periodic functions, M.S. Dissertation, Beijing Normal University, 1981 (Chinese)
Oskolkov K.I., On the Lebesgue’s inequality in the uniform metric and on the set of full measure. Mat. Zamatki 18;4 (1975), 515–526 (Russian)
Stechkin S.B., On the approximation of periodic functions by Vallee-Poussin sums. Analysis Math. 4 (1978), 61–74 (Russian)
Sun, Young-sheng, The uniform approximation of bivariate periodic Fourier sums, Beijing Shifandaxue Xuebao Nat. Sci. 3 (1979), 16–35 (Chinese)
Timan M.F. and Ponomarenko V.G., Approximation of periodic functions with two variables by summation of Marcinkiewicz’s type, Izv. Vyss. Ucebn. Zaved. Mathematika (1975), No. 9, 59–67 (Russian)
Lu, Shan-zhen, Some problems of Fourier analysis and approximation of functions with several variables. Proceedings of the conference on approximation theory, Hangzhon, 1978, 35–41 (Chinese)
Lu, Shan-zhen, Spherical summation of multiple Fourier series and its conjugate Fourier integral, Kexae Tongbao (1980), No. 5, 199–202 (Chinese)
Stein E.M., On certain exponential sums arising in multiple Fourier series, Ann. of Math. 73 (1961), 87–109
Lu, Shan-zhen, Multiple bounded variation function and spherical summation of its Fourier series, Kexue Tongbao (1981), No. 1, 1–4 (Chinese)
Lu, Shan-zhen, The (C,l) summation of multiple conjugate Fourier integral, Kexue Tongbao (1981), No. 19, 865–869 (Chinese)
Lu, Shan-zhen, On the convergence of spherical integral and Riesz spherical mean summation. Acta Math. Sinica 23:4 (1980), 609–623 (Chinese)
Pan, Wen-jie, On the localization and convergence of multiple Fourier integrals by spherical means, Scienta Sinica (1981), No. 11, 1310–1321 (Chinese)
Shen, Xie-chang and Lou, Yuna-ren, The best approximation by rational functions on the unit circle, 20:3 (1977), 232–235 (Chinese)
Mergeljan, S.N. and Dzarbasjan M.M. On best approximation by rational functions, Dokl. Akad. Nauk SSSR, 99:5 (1954), 673–675 (Russian)
Andersson, J.E. and Ganelius, T., The degree of approximation by rational functions with fixed poles. Math. Zeit. 153 (1977), 161–166
Pekarskii, Q.A., The degree of rational approximation with preassigned poles. Dokl. Akad. Nauk Bararuciea SSR 21;4 (1977), 302–304 (Russian)
Shen, Xie-chang and Lou Yuna-ren, On the best approximation by rational functions in the Hp (p >1) space. Acta Sci. Natur. Univ. Pekinensis, (1979), No. 1, 58–72
Elliolt, H.M., On approximation to analytic functions by rational functions, Proc. Amer. Math. Soc. 4:1 (1953), 161–167
Walsh, J.L., Note on degree of approximation to analytic functions by rational functions with preassigned poles, Proc. Nat. Acad. Sci. U.S.A. 42:12 (1956), 927–930
Al’per S.Yu., On the uniform approximation of functions with a complex variable in the closed domain, Izv. Akad. Nauk SSSR, Ser. Mat. 19 (1955), 423–444 (Russian)
Shen, Xie-chang and Lou Yuna-ren, The best approximation by rational functions in the domain of complex plane. Acta Math. Sinica 20:4 (1977), 301–303 (Chinese)
Shen, Xie-chang, The problem of the best approximation by rational functions with preassigned poles. Acta Math. Sinica 1:1 (1978), 86–90 (Chinese)
Shen, Xie-chang, On the best approximation of functions in the Ep(l<p=+∞) space by rational functions with preassigned poles. Annals of Math. 1:1 (1980), 51–62 (Chinese)
Su, Zhan-long, On the best approximation of functions in the E1 space by rational functions with preassigned poles, (to appear in Journal of Math. Res. and Exp.)
Shen, Xie-chang and Lou, Yuna-ren, The best approximation by rational functions in space Ep(p>l) to the complex plane. Acta Sci. Natur. Univ. Pekinensis 2 (1979), 1–18 (Chinese)
Shen, Xie-chang, Approximation and expansion by rational functions in certain class of domains, A Monthly Journal of Sci. 25:2 (1980), 97–102
Shen, Xie-chang, Approximation by rational functions in complex plane, Scienta Sinica 24:8 (1981), 1033–1046
Shen, Xie-chang, On the expansion by means of rational functions in a certain class of domains, Scienta Sinica. 24:11 (1981) 1489–1496
Shen, Xie-chang, The remainder estimation of the expansion by means of rational functions in Ep(l<p=+∞). Annals of Math. 2:3 (1981), 301–320
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© 1982 Birkhäuser Verlag Basel
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Xie-chang, S. (1982). A Survey of Recent Results on Approximation Theory in China. In: Schempp, W., Zeller, K. (eds) Multivariate Approximation Theory II. International Series of Numerical Mathematics / Internationale Schriftenreihe zur Numerischen Mathematik / Série internationale d’Analyse numérique, vol 61. Birkhäuser Basel. https://doi.org/10.1007/978-3-0348-7189-1_31
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DOI: https://doi.org/10.1007/978-3-0348-7189-1_31
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