Result 1 to 20 of 124 total
A meshless method for solving the free boundary problem associated with unilateral obstacle. (English)
Int. J. Comput. Math. 89, No. 1, 90-97 (2012).
1
Non-polynomial quintic spline solution for the system of third order boundary-value problems. (English)
Numer. Algorithms 59, No. 4, 541-559 (2012).
2
A level set based shape optimization method for an elliptic obstacle problem. (English)
Math. Models Methods Appl. Sci. 21, No. 4, 619-649 (2011).
3
Multigrid methods for elliptic obstacle problems on 2D bisection grids. (English)
Huang, Yunqing (ed.) et al., Domain decomposition methods in science and engineering XIX. Selected papers based on the presentations at the 19th international conference on domain decoposition (DD19), Zhanjiajie, China, August 17‒22, 2009. Berlin: Springer (ISBN 978-3-642-11303-1/hbk; 978-3-642-11304-8/ebook). Lecture Notes in Computational Science and Engineering 78, 229-236 (2011).
4
Hierarchical error estimates for the energy functional in obstacle problems. (English)
Numer. Math. 117, No. 4, 653-677 (2011).
5
Efficient and reliable hierarchical error estimates for the discretization error of elliptic obstacle problems. (English)
Math. Comput. 80, No. 273, 69-88 (2011).
6
A posteriori error estimator for obstacle problems. (English)
SIAM J. Sci. Comput. 32, No. 5, 2627-2658 (2010).
7
The numerical solution of second-order boundary-value problems by collocation method with the Haar wavelets. (English)
Math. Comput. Modelling 52, No. 9-10, 1577-1590 (2010).
8
A numerical approach to the proof of existence of solutions for some generalized obstacle problems. (English)
Appl. Math. Comput. 216, No. 11, 3365-3369 (2010).
9
Error reduction in adaptive finite element approximations of elliptic obstacle problems. (English)
J. Comput. Math. 27, No. 2-3, 148-169 (2009).
10
A Newton method for reconstructing non star-shaped domains in electrical impedance tomography. (English)
Inverse Probl. Imaging 3, No. 2, 353-371 (2009).
11
Computational techniques for solving differential equations by cubic, quintic, and sextic spline. (English)
Int. J. Comput. Methods Eng. Sci. Mech. 10, No. 1, 108-115 (2009).
12
A hybrid extragradient method for general variational inequalities. (English)
Math. Methods Oper. Res. 69, No. 1, 141-158 (2009).
13
Family of numerical methods based on non-polynomial splines for solution of contact problems. (English)
Commun. Nonlinear Sci. Numer. Simul. 13, No. 7, 1448-1460 (2008).
14
A posteriori error estimates for parabolic variational inequalities. (English)
J. Sci. Comput. 37, No. 3, 336-366 (2008).
15
Components identification based method for box constrained variational inequality problems with almost linear functions. (English)
BIT 48, No. 4, 799-819 (2008).
16
Computational techniques for solving differential equations by quadratic, quartic and octic spline. (English)
Adv. Eng. Softw. 39, No. 8, 646-653 (2008).
17
Multilevel block factorization preconditioners. Matrix-based analysis and algorithms for solving finite element equations. (English)
New York, NY: Springer (ISBN 978-0-387-71563-6/hbk). xiv, 529~p. EUR~79.95/net; SFR~139.50; \sterling~61.50; \$~99.00 (2008).
18
Convergence of cubic-spline approach to the solution of a system of boundary-value problems. (English)
Appl. Math. Comput. 192, No. 2, 319-331 (2007).
19
Regularity of solutions of obstacle problems. (English)
AJXJTU, Acad. J. Xi’an Jiaotong Univ. 19, No. 1, 7-8,55 (2007).
20
Result 1 to 20 of 124 total
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