On the Existence of Strongly Continuous Physical Solutions for Classes of Autonomous Evolutionary Variational Inequalities

1. N. V. Gorban, O. V. Kapustyan, and P. O. Kasyanov, “Uniform trajectory attractor for non-autonomous reaction–diffusion equations with Caratheodory’s nonlinearity,” Nonlinear Analysis, 98, 13–26 (2014), http://dx.doi.org/10.1016/j.na.2013.12.004.

2. P. Kalita and G. Lukaszewicz, “Global attractors for multivalued semiflows with weak continuity properties,” Nonlinear Analysis: Theory, Methods & Applications, 101, 124–143 (2014).

   Article  MATH  MathSciNet  Google Scholar 

3. H. Gaevsky, K. Greger, and K. Zakharias, Nonlinear Operator Equations and Operator Differential Equations [Russian translation], Mir, Moscow (1978).

   Google Scholar 

4. M. Z. Zgurovsky, P. O. Kasyanov, and V. S. Mel’nik, Differential-Operator Inclusions and Variational Inequalities in Infinitely Dimensional Spaces [in Russian], Naukova Dumka, Kyiv (2008).

   Google Scholar 

5. M. Z. Zgurovsky, P. O. Kasyanov, O. V. Kapustyan, J. Valero, and N. V. Zadoianchuk, Evolution Inclusions and Variation Inequalities for Earth Data Processing. III. Long-Time Behaviour of Evolution Inclusions Solutions in Earth Data Analysis, Series: Advances in Mechanics and Mathematics, 27, Springer, Berlin (2012).

6. M. Z. Zgurovsky and P. O. Kasyanov, “Multivalued dynamics of solutions for autonomous operator differential equations in strongest topologies,” in: Continuous and Distributed Systems: Theory and Applications, Solid Mechanics and Its Applications, 211 (2014), pp. 149–162.

7. M. Z. Zgurovsky, V. S. Mel’nik, and P. O. Kasyanov, Evolution Inclusions and Variation Inequalities for Earth Data Processing. II. Differential-Operator Inclusions and Evolution Variation Inequalities for Earth Data Processing, Series: Advances in Mechanics and Mathematics, 25, Springer, Berlin (2011).

8. J.-L. Lions, Some Methods of Solution of Nonlinear Boundary-Value Problems [Russian translation], Mir, Moscow (1972).

   Google Scholar 

9. J. M. Ball, “Continuity properties and global attractors of generalized semiflows and the Navier–Stokes equations,” Journal of Nonlinear Sciences, 7, No. 5, 475–502 (1997).

   Article  MATH  Google Scholar 

10. P. O. Kasyanov, “Multivalued dynamics of solutions of an autonomous differential-operator inclusion with pseudomonotone nonlinearity,” Cybernetics and Systems Analysis, 47, No. 5, 800–811 (2011).

    Article  MATH  MathSciNet  Google Scholar 

11. P. O. Kasyanov, V. S. Mel’nik, and S. Toscano, “Solutions of Cauchy and periodic problems for evolution inclusions with multi-valued \( {w}_{\uplambda_0} \) -pseudomonotone maps,” Journal of Differential Equations, 249, No. 6, 1258–1287 (2010).

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