TU Tian-Liang , MO Jiong . INTERPOLATION SOLUTION TO A BOUNDARY VALUE PROBLEM OF HARMONIC FIELD[J]. Acta mathematica scientia, Series B, 2013 , 33(2) : 321 -332 . DOI: 10.1016/S0252-9602(13)60001-6

[1] Tu Tian Liang, Mo Jiong. Interpolatory approximation to harmonic function with boundary data. Acta Mathematica Scientia (Chinese Ser), 2010, 30A(2): 397–404

[2] Tu Tian Liang. The Simultaneous approximation order by Hermite interpolation in a smooth domain. Acta Math Sin (Engl Ser), 2002, 18(4): 631–646

[3] Tu Tian Liang, Deng Ji En. Stability of Approximation by Hermite-Fej´er Interpolation at Disturbed Fejér Points on in the Complex Domain. Acta Mathematica Sinica (Chinese Ser), 2010, 53(3): 393–408

[4] Tu Tian Liang. Simultaneous approximation by complex Hermite interpolation at disturbed Fejér points. Sci in China, 2010, 40(4): 349–366 (in Chinese)

[5] Shen Xiechang, Shuai Binpeng. Order of approximation by Lagrange interpolating polynomials at nearly roots of unity. J of Math (PRC), 1991, 11(3): 287–297 (in Chinese)

[6] Curtiss J H. Transfinite diainter and harmonic polynomial interpolation. J d’Analysc Math, 1969, 22: 371–389

[7] Menke K. L¨osung des Dirichlet-proplem bei Jordangebieten mit analytischen Rand durch interpolation. Monatshefte f¨ur Math, 1975, 80: 197–306

[8] Al′per S Ya. On uniform approximation to function of a complex variable in closed domain. Izv ANSSR Ser Math, 1955, 19: 423-444 (in Russian)

[9] Tu Tian Liang. Jackson type theorems on complex curve. Sci in China Ser A-Math, 2009, 52(3): 493–506

[10] Natanson I P. The Theory of Function of a Real Varible. Mockow: GIT-TL, 1950 (in Russian)

[11] P´olya G, Szeg¨o G. Problems and Theorems in Analysis. Mockow: GIT-TL, 1956: 60 (in Russian)

[12] Dzyadyk V K. Introduction of Uniform Approximation to Functions by Polynomials. Moskow: Nauka, 1977: 178; 452–456 (in Russian)