Smooth interpolation in triangles. (English) Zbl 0271.41002


41A05 Interpolation in approximation theory
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[1] Birkhoff, G; Gordon, W.J, The Draftsman’s and related equations, J. approximation theory, 1, 199-208, (1968) · Zbl 0189.40902
[2] Coons, S.A; Coons, S.A, Surfaces for computer-aided design of space forms, Project MAC report, Mac-tr-41, (June 1967), Available from CFSTI, Sills Building, 5285 Port Royal Road, Springfield. VA 22151
[3] Davis, P.J, Interpolation and approximation, (1963), Blaisdell New York · Zbl 0111.06003
[4] Gordon, W.J, Distributive lattices and the approximation of multivariate functions, (), 223-277
[5] Gordon, W.J, Free-form surface interpolation through curve networks, General motors research report GMR-921, (October 1969)
[6] Gordon, W.J; Gordon, W.J, “blending function” methods of bivariate and multivariate interpolation and approximation, General motors research report GMR-834B, SIAM J. numer. anal., 8, 158-177, (1971) · Zbl 0237.41008
[7] Hall, C.A, Bicubic interpolation over triangles, J. math. mech., 19, 1-11, (1969) · Zbl 0194.47102
[8] Kaplan, W, Advanced calculus, (1952), Addison-Wesley Reading, MA · Zbl 0047.28308
[9] Mangeron, D, Sopra un problema al contorno…, Rend. accad sci. fis. mat. napoli, 2, 28-40, (1962) · Zbl 0005.35702
[10] Nicolesco, M, LES fonctions polyharmoniques, (1936), Hermann Paris · JFM 62.1302.01
[11] Sard, A, Linear approximation, (1963), American Mathematical Society Providence, RI · Zbl 0115.05403
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