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Keywords:
a priori estimates; convergence; dual finite element procedure; parital differential equations; semi-coercive boundary value problems; elliptic type
a priori estimates; convergence; dual finite element procedure; parital differential equations; semi-coercive boundary value problems; elliptic type
References:
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[2] Hlaváček I.: Dual finite element analysis for elliptic problems with obstacles on the boundary I. Apl. mat. 22 (1977), 244-255 MR 0440958
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[4] Duvaut G., Lions J. L.: Les inéquations en mécanique et en physique. Dunod, Paris 1972. MR 0464857 | Zbl 0298.73001
[5] Haslinger J., Hlaváček I.: Convergence of a finite element method based on the dual variational formulation. Apl. mat. 21 (1976), 43 - 65. MR 0398126
[6] Céa J.: Optimisation, théorie et algorithmes. Dunod, Paris 1971. MR 0298892
[7] Falk R. S.: Error estimates for the approximation of a class of variational inequalities. Math. Соmр. 28 (1974), 963-971. MR 0391502 | Zbl 0297.65061
[8] Fichera G.: Boundary value problems of elasticity with unilateral constraints. Encycl. of Physics (ed. S. Flügge), vol. VI a/2. Springer, Berlin 1972.
[9] Nečas J.: Les méthodes directes en théorie des équations elliptiques. Academia, Prague 1967. MR 0227584
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