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Optimization
A Journal of Mathematical Programming and Operations Research
Volume 69, 2020 - Issue 4
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Articles

A class of history-dependent differential variational inequalities with application to contact problems

Stanisław MigórskiCollege of Applied Mathematics, Chengdu University of Information Technology, Chengdu, Sichuan Province, People's Republic of China;Chair of Optimization and Control, Jagiellonian University in Krakow, Krakow, PolandView further author information
,
Zhenhai LiuGuangxi Colleges and Universities Key Laboratory of Complex System Optimization and Big Data Processing, Yulin Normal University, Yulin, People's Republic of China;College of Sciences, Guangxi University for Nationalities, Nanning, Guangxi, People's Republic of ChinaView further author information
&
Shengda ZengFaculty of Mathematics and Computer Science, Jagiellonian University in Krakow, Krakow, PolandCorrespondence[email protected]
View further author information
Pages 743-775 | Received 08 Feb 2019, Accepted 15 Jul 2019, Published online: 29 Jul 2019

References

  • Aubin JP, Cellina A. Differential inclusions: set-valued maps and viability theory. Berlin: Springer-Verlag; 1984.
  • Pang JS, Stewart DE. Differential variational inequalities. Math Program. 2008;113:345–424. doi: 10.1007/s10107-006-0052-x
  • Chen X, Wang Z. Convergence of regularized time-stepping methods for differential variational inequalities. SIAM J Optim. 2013;23:1647–1671. doi: 10.1137/120875223
  • Loi NV. On two-parameter global bifurcation of periodic solutions to a class of differential variational inequalities. Nonlinear Anal Theory Methods Appl. 2015;122:83–99. doi: 10.1016/j.na.2015.03.019
  • Stewart DE. Uniqueness for solutions of differential complementarity problems. Math Program. 2009;118:327–345. doi: 10.1007/s10107-007-0195-4
  • Van NT, Ke TD. Asymptotic behavior of solutions to a class of differential variational inequalities. Ann Polon Math. 2015;114:147–164. doi: 10.4064/ap114-2-5
  • Liu ZH, Motreanu D, Zeng SD. On the well-posedness of differential mixed quasi-variational inequalities. Topol Methods Nonlin Anal. 2018;51:135–150.
  • Liu ZH, Zeng SD, Motreanu D. Evolutionary problems driven by variational inequalities. J Diff Equ. 2016;260:6787–6799. doi: 10.1016/j.jde.2016.01.012
  • Liu ZH, Zeng SD, Motreanu D. Partial differential hemivariational inequalities. Adv Nonlinear Anal. 2018;7:571–586. doi: 10.1515/anona-2016-0102
  • Liu ZH, Migórski S, Zeng SD. Partial differential variational inequalities involving nonlocal boundary conditions in Banach spaces. J Differ Equ. 2017;263:3989–4006. doi: 10.1016/j.jde.2017.05.010
  • Gwinner J. On a new class of differential variational inequalities and a stability result. Math Program. 2013;139:205–221. doi: 10.1007/s10107-013-0669-5
  • Gwinner J. Three-field modelling of nonlinear non-smooth boundary value problems and stability of differential mixed variational inequalities. Abstract Appl Anal. 2013. pages 10, ID 108043.
  • Liu ZH, Zeng SD. Differential variational inequalities in infinite Banach spaces. Acta Math Sci. 2017;37:26–32. doi: 10.1016/S0252-9602(16)30112-6
  • Liu ZH, Sofonea M. Differential quasivariational inequalities in contact mechanics. Math Mechanics Solids. 2018;12:845–861.
  • Migórski S, Zeng SD. Hyperbolic hemivariational inequalities controlled by evolution equations with application to adhesive contact model. Nonlinear Anal Real World Appl. 2018;43:121–143. doi: 10.1016/j.nonrwa.2018.02.008
  • Migórski S, Zeng SD. A class of differential hemivariational inequalities in Banach spaces. J Glob Optim. 2018;72:761–779. doi: 10.1007/s10898-018-0667-5
  • Migórski S, Zeng SD. A class of generalized evolutionary problems driven by variational inequalities and fractional operators. Set-Valued Var Anal. (2018). doi:10.1007/s11228-018-0502-7
  • Migórski S, Zeng SD. Mixed variational inequalities driven by fractional evolution equations. Acta Math Sci. 2019;39:461–468.
  • Nguyen TVA, Tran DK. On the differential variational inequalities of parabolic-elliptic type. Math Method Appl Sci. 2017. doi:10.1002/mma.4334
  • Zeng SD, Liu Z, Migórski S. A class of fractional differential hemivariational inequalities with application to contact problem. Z Angew Math Phys. 2018;69:36. pages 23. doi: 10.1007/s00033-018-0929-6
  • Zeng SD, Migórski S. A class of time-fractional hemivariational inequalities with application to frictional contact problem. Commun Nonlinear Sci. 2018;56:34–48. doi: 10.1016/j.cnsns.2017.07.016
  • Sofonea M, Migórski S. Variational-hemivariational inequalities with applications. Boca Raton: Chapman & Hall/CRC; 2017. (Monographs and Research Notes in Mathematics).
  • Migórski S, Zeng SD. Penalty and regularization method for variational-hemivariational inequalities with application to frictional contact. Z Angew Math Mech (ZAMM). 2018;98:1503–1520. doi: 10.1002/zamm.201700348
  • Sofonea M, Matei A. Mathematical models in contact mechanics, London Mathematical Society, Lecture Note Series. Vol. 398, Cambridge University Press; 2012.
  • Li XS, Huang NJ, O'Regan D. Differential mixed variational inequalities in finite dimensional spaces. Nonlinear Anal Theory Methods Appl. 2010;72:3875–3886. doi: 10.1016/j.na.2010.01.025
  • Migórski S, Ochal A, Sofonea M. A class of variational-hemivariational inequalities in reflexive Banach spaces. J Elasticity. 2017;127:151–178. doi: 10.1007/s10659-016-9600-7
  • Denkowski Z, Migórski S, Papageorgiou NS. An introduction to nonlinear analysis: theory. Boston: Kluwer Academic/Plenum; 2003.
  • Denkowski Z, Migórski S, Papageorgiou NS. An introduction to nonlinear analysis: applications. Boston: Kluwer Academic/Plenum; 2003.
  • Migórski S, Ochal A, Sofonea M. Nonlinear inclusions and hemivariational inequalities. Models Anal Contact Problems. Vol. 26, New York: Springer; 2013. (Advances in Mechanics and Mathematics).
  • Zeidler E. Nonlinear functional analysis and applications. New York: Springer; 1990. (II A/B).
  • Pascali D, Sburlan S. Nonlinear mappings of monotone type. Alpen aan den Rijn: Sijthoff and Noordhoff; 1978.
  • Migórski S, Ochal A, Sofonea M. History-dependent subdifferential inclusions and hemivariational inequalities in contact mechanics. Nonlinear Anal Real World Appl. 2011;12:3384–3396. doi: 10.1016/j.nonrwa.2011.06.002
  • Migórski S, Ochal A, Sofonea M. History-dependent variational hemivariational inequalities in contact mechanics. Nonlinear Anal Real World Appl. 2015;22:604–618. doi: 10.1016/j.nonrwa.2014.09.021
  • Panagiotopoulos PD. Inequality problems in mechanics and applications. Boston: Birkhäuser; 1985.
  • Sofonea M, Migórski S. A class of history-dependent variational-hemivariational inequalities. Nonlinear Differential Equations and Applications NoDEA. 2016;23. pages 23. doi: 10.1007/s00030-016-0391-0
  • Amassad A, Fabre C, Sofonea M. A quasistatic viscoplastic contact problem with normal compliance and friction. IMA J Appl Math. 2004;69:463–482. doi: 10.1093/imamat/69.5.463
  • Kuttler KL, Shillor M. Dynamic contact with normal compliance wear and discontinuous friction coefficient. SIAM J Math Anal. 2002;34:1–27. doi: 10.1137/S0036141001391184
  • Han JF, Li YX, Migórski S. Analysis of an adhesive contact problem for viscoelastic materials with long memory. J Math Anal Appl. 2015;427:646–668. doi: 10.1016/j.jmaa.2015.02.055
  • Jarusek J, Sofonea M. On the solvability of dynamic elastic-visco-plastic contact problems. Z Angew Math Mech (ZAMM). 2008;88:3–22. doi: 10.1002/zamm.200710360
  • Zeng SD, Migórski S. Noncoercive hyperbolic variational inequalities with applications to contact mechanics. J Math Anal Appl. 2017;455:619–637. doi: 10.1016/j.jmaa.2017.05.072
  • Bartosz K. Hemivariational inequalities modeling dynamic contact problems with adhesion. Nonlinear Anal Theory Methods Appl. 2009;71:1747–1762. doi: 10.1016/j.na.2009.01.011
  • Chau O, Shillor M, Sofonea M. Dynamic frictionless contact with adhesion. Z Angew Math Phys. 2004;55:32–47. doi: 10.1007/s00033-003-1089-9
  • Han W, Sofonea M. Quasistatic contact problems in viscoelasticity and viscoplasticity. Studies in advanced mathematics, Vol. 30, American Mathematical Society, Providence, RI, International Press, Somerville, MA, 2002.
  • Migórski S, Ochal A. Dynamic bilateral contact problem for viscoelastic piezoelectric materials with adhesion. Nonlinear Anal Real World Appl. 2008;69:495–509. doi: 10.1016/j.na.2007.05.036
  • Sofonea M, Han W, Shillor M. Analysis and approximation of contact problems with adhesion or damage. Boca Raton: Chapman & Hall/CRC; 2006.

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