- Adams , R.A. “ Sobolev Spaces ” .
- Browder , F.E. 1983 . Fixed point theory and nonlinear problems . Bull. Amer. Math. Sos. , 9 : 1 – 39 .
- Fuocik , S. and Kufner , A. “ Nonlinear Differential Equations ” .
- Hasanov , A. and Mamedov , A. 1994 . An Inverse Problem Related to the Determination of Elastoplastic Properties of a Plate . Inverse Problems , 10 : 601 – 615 .
- Hasanov , A. 1995 . An Inverse Problem for an Elastoplastic Medium . SIAM J. Appl. Math. , 55 : 1736 – 1752 .
- Hirano , N. 1990 . Multiple solutions for quasilinear elliptic equations . Nonlinear. Anal. T.M.A. , 24 : 625 – 38 .
- Kachanov , L.M. “ The Theory of Greep ” . In National Library for Sciences and Technology
- Ladyzhenskaya , O.A. and Ural'tceva , N.N. “ Linear and Quasilinear Elliptic Equations ” .
- Langenbach , A. 1964 . Verallgemeinerte und exakte Losunqen des Problems der elastisch-plastichen Torsion von Sidben . Math. Nachr. , 28 : 219 – 34 .
- Lions , J.L. “ Quelques Methodes de Resolution des Problemes aux Limites non Lineares ” .
- Ma , T.F. 1996 . Maltiplicity results for a quasilinear elliptic equation. . Applicable Analysis , 62 : 211 – 21 .
- Mamedov , A. 1995 . An Inverse Problem Related To The Determinaiiono] Elastoplastic Properties of a Cylindrical Bar . Int. J. Non-Linear Mechanics , 30 : 23 – 32 .
- Natanson , I.P. “ Theory of Functions Real Variable ” . (in Russian)
- Payne , L.E. and Philippin , G.A. 1977 . Some applications of the maximum principle in the problem of torsional creep . SIAM J. Appl. Math. , 33 : 446 – 55 .
- Payne , L.E. and Philippin , G.A. 1979 . Some maximum principles for nonlinear elliptic equations in divergence form with applications to capillary surfaces and to surfaces of constant mean curvature . J. Nonlinear Anal. , 3 : 193 – 211 .
- Payne , L.E. and Philippin , G.A. 1980 . On maximum principles for the class of nonlinear second order elliptic equations. . J. Diff. Equations , 37 : 39 – 48 .
- Porru , G. , Tewodros , A. , Vernier-Piro , S. and Vainberg , M.M. “ Variational Method and Method of Monotone Operators in the Theory of Nonlinear Equations ” .
- Vainberg , M.M. 1973 . Variational Method and Method of Monotone Operators in the Theory of Nonlinear Equations , New York : John Wiley .
Strong coefficient stability for quasilinear elliptic equations with application to inverse coefficient problems
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