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## Search the dblp DataBase
Ming-Jun Lai:
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## Publications of Author- Ming-Jun Lai
**Construction of multivariate compactly supported orthonormal wavelets.**[Citation Graph (0, 0)][DBLP] Adv. Comput. Math., 2006, v:25, n:1-3, pp:41-56 [Journal] - Ming-Jun Lai, Alain Le Méhauté
**A New Kind of Trivariate C**[Citation Graph (0, 0)][DBLP]^{1}Macro-element. Adv. Comput. Math., 2004, v:21, n:3-4, pp:273-292 [Journal] - Ming-Jun Lai, Paul Wenston
**L**[Citation Graph (0, 0)][DBLP]_{1}Spline Methods for Scattered Data Interpolation and Approximation. Adv. Comput. Math., 2004, v:21, n:3-4, pp:293-315 [Journal] - Charles K. Chui, Ming-Jun Lai
**Filling polygonal holes using C1 cubic triangular spline patches.**[Citation Graph (0, 0)][DBLP] Computer Aided Geometric Design, 2000, v:17, n:4, pp:297-307 [Journal] - Charles K. Chui, Ming-Jun Lai
**Algorithms for generating B-nets and graphically displaying spline surfaces on three- and four-directional meshes.**[Citation Graph (0, 0)][DBLP] Computer Aided Geometric Design, 1991, v:8, n:6, pp:479-493 [Journal] - Ming-Jun Lai
**A characterization theorem of multivariate splines in blossoming form.**[Citation Graph (0, 0)][DBLP] Computer Aided Geometric Design, 1991, v:8, n:6, pp:513-521 [Journal] - Ming-Jun Lai
**Approximation order from bivariate C1-cubics on a four-directional mesh is full.**[Citation Graph (0, 0)][DBLP] Computer Aided Geometric Design, 1994, v:11, n:2, pp:215-223 [Journal] - Ming-Jun Lai
**Geometric interpretation of smoothness conditions of triangular polynomial patches.**[Citation Graph (0, 0)][DBLP] Computer Aided Geometric Design, 1997, v:14, n:2, pp:191-199 [Journal] - Ming-Jun Lai
**Scattered data interpolation and approximation using bivariate C**[Citation Graph (0, 0)][DBLP]_{1}piecewise cubic polynomials. Computer Aided Geometric Design, 1996, v:13, n:1, pp:81-88 [Journal] - Ming-Jun Lai, Alain Le Méhauté, Tatyana Sorokina
**An octahedral**[Citation Graph (0, 0)][DBLP]*C*^{2}macro-element. Computer Aided Geometric Design, 2006, v:23, n:8, pp:640-654 [Journal] - Wenjie He, Ming-Jun Lai
**Construction of trivariate compactly supported biorthogonal box spline wavelets.**[Citation Graph (0, 0)][DBLP] Journal of Approximation Theory, 2003, v:120, n:1, pp:1-19 [Journal] - Ming-Jun Lai
**Construction of multivariate compactly supported prewavelets in**[Citation Graph (0, 0)][DBLP]*L*_{2}space and pre-Riesz bases in Sobolev spaces. Journal of Approximation Theory, 2006, v:142, n:2, pp:83-115 [Journal] - Xinghua Wang, Ming-Jun Lai, Shijun Yang
**On the divided differences of the remainder in polynomial interpolation.**[Citation Graph (0, 0)][DBLP] Journal of Approximation Theory, 2004, v:127, n:2, pp:193-197 [Journal] - Jeffrey S. Geronimo, Ming-Jun Lai
**Factorization of multivariate positive Laurent polynomials.**[Citation Graph (0, 0)][DBLP] Journal of Approximation Theory, 2006, v:139, n:1-2, pp:327-345 [Journal] - Ming-Jun Lai
**The convergence of three L**[Citation Graph (0, 0)][DBLP]_{1}spline methods for scattered data interpolation and fitting. Journal of Approximation Theory, 2007, v:145, n:2, pp:196-211 [Journal] - Ming-Jun Lai, Larry L. Schumaker
**Macro-elements and stable local bases for splines on Powell-Sabin triangulations.**[Citation Graph (0, 0)][DBLP] Math. Comput., 2003, v:72, n:241, pp:335-354 [Journal] - Wenjie He, Ming-Jun Lai
**Examples of bivariate nonseparable compactly supported orthonormal continuous wavelets.**[Citation Graph (0, 0)][DBLP] IEEE Transactions on Image Processing, 2000, v:9, n:5, pp:949-953 [Journal] **The Convergence of a Central-Difference Discretization of Rudin-Osher-Fatemi Model for Image Denoising.**[Citation Graph (, )][DBLP]**On the approximation power of bivariate splines.**[Citation Graph (, )][DBLP]
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