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References
R. Glowinski, J.L. Lions, R. Tremoliéres: Analyse numérique des des inéquations variationnelles. Dunod, Paris 1976.
J. Kačur: The Rothe method and nonlinear parabolic equations of arbitrary order. Theory of nonlinear operators-Summer school-Neuendorf 1972. Akademie-Verlag. Berlin 1974, 125–131.
—: Application of Rothe's method to nonlinear evolution equations. Mat. Časopis Sloven. Akad. Vied 25, 1975, 63–81.
—: Method of Rothe and nonlinear parabolic boundary value problems of arbitrary order. Czech. Math. J., 28 103, 1978
—: On an approximate solution of variational inequalities. Math. Nachr., 123, 1985, 63–82.
—: Method of Rothe in Evolution Equations. TEUBNER-TEXTE zur Mathematik, Leipzig, to appear.
A.G. Kartsatos, M.E. Parrott: A method of lines for a nonlinear abstract functional differential equations. Trans. Am. Mth. Soc. V-286, N-1, 1984, 73–91.
—: Functional evolution equations involving time dependent maximal monotone operators in Banach spaces. Nonlinear analysis Theory, Methods and Applications. Vol.8, 1984, 817–833.
J. Nečas: Applications of Rothe's method to abstract parabolic equations. Czech. Math. J. 24, 1974, 496–500.
K. Rektorys: On application of direct variational methods to the solution of parabolic boundary value problems of arbitrary order in the space variables. Czech. Math. J., 21, 1971, 318–339.
M. Zlámal: Finite element solution of quasistationary nonlinear magnetic fields. RAIRO, Anal. Num., V-16, 1982, 161–191.
A. Ženíšek: Approximation of parabolic variational inequalities. Aplikace matematiky, to appear.
J. Brilla: New functional spaces and linear nonstationary problems of mathematical physics. EQUADIFF 5-Proceedings of the conference held in Bratislava, 1981. TEUBNER-TEXTE zur Mathematik, Band 47, Leipzig, 1982.
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Kačur, J. (1986). Method of rothe in evolution equations. In: Vosmanský, J., Zlámal, M. (eds) Equadiff 6. Lecture Notes in Mathematics, vol 1192. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0076049
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DOI: https://doi.org/10.1007/BFb0076049
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