Advanced search
Publication Cover
Applicable Analysis
An International Journal
Volume 101, 2022 - Issue 16
Submit an article Journal homepage
81
Views
2
CrossRef citations to date
0
Altmetric
Research Article

Nonlinear thermoviscoelastic Timoshenko beams with dynamic frictional contact

Jeongho AhnDepartment of Mathematics and Statistics, Arkansas State University, State University, AR, USACorrespondence[email protected]
Pages 5615-5642 | Received 29 May 2020, Accepted 12 Feb 2021, Published online: 18 Mar 2021

References

  • Ahn J. A viscoelastic Timoshenko beam with Coulomb law of friction. Appl Math Comput. 2012;218:7078–7099.
  • Andrews KT, Shillor M, Wright S. On the dynamic vibrations of an elastic beam in frictional contact with a rigid obstacle. J Elast. 1996;42:1–30.
  • Bajkowski J, Fernándezw JR, Kuttler KL, et al. A thermoviscoelastic beam model for brakes. Eur J Appl Math. 2004;15(2):181–202.
  • Gu RJ, Kuttler KL, Shillor M. Frictional wear of a thermoelastic beam. J Math Anal Appl. 2000;242:212–236.
  • Kuttler KL, Renard Y, Shillor M. Models and simulations of dynamic frictional contact of a beam. Comput Methods Appl Mech Eng. 1999;177:259–272.
  • Kirchhoff G. Mechanik. Leipzig: Teubner; 1883.
  • Kuttler KL, Shillor M. Dynamic bilateral contact with discontinuous friction coefficient. Nonlinear Anal. 2001;45:309–327.
  • Kuttler KL, Shillor M. Dynamic contact with normal compliance wear and discontinuous friction coefficient. SIAM J Math Anal. 2002;34(1):1–27.
  • Kuttler KL, Shillor M. Dynamic contact with Signorini's condition and slip rate dependent friction. Electron J Differ Equ. 2004;2004(83):1–21.
  • Bernardi C, Copetti MIM. Discretization of a nonlinear dynamic thermoviscoelastic Timoshenko beam model. ZAMM. 2017;97(5):532–549.
  • Azzollini A. The Kirchhoff equation in RN perturbed by a local nonlinearity. Differ Integral Equ. 2012;25:543–554.
  • Huang Y, Liu Z, Wu Y. On Kirchhoff type equations with critical Sobolev exponent. J Math Anal Appl. 2018;462:483–504.
  • Perera K, Zhang Z. Nontrivial solutions of Kirchhoff-type problems via the Yang index. J Differ Equ. 2006;221:246–255.
  • Sun J, Cheng Y, Wu TF, et al. Positive solutions of a superlinear Kirchhoff type equation in RN ( N≥4). Commun Nonlinear Sci Numer Simul. 2019;71:141–160.
  • Andersson LE. Existence results for quasistatic contact problems with Coulomb friction. Appl Math Optim. 2000;42(2):169–202.
  • Rocca R, Cocu M. Existence and approximation of a solution to quasistatic Signorini problem with local friction. Int J Eng Sci. 2001;39:1233–1255.
  • Paumier J-C, Renard Y. Surface perturbation of an elastodynamic contact problem with friction. Eur J Appl Math. 2003;14:465–483.
  • Gao DY. Nonlinear elastic beam theory with application in contact problems and variational approaches. Mech Res Commun. 1996;23(1):11–17.
  • Ahn J, Park EJ. Dynamic frictionless contact of a nonlinear beam with two stops. Appl Anal. 2015;94(7):1355–1379.
  • Andrews KT, M'Bengue MF, Shillor M. Vibrations of a nonlinear dynamic beam between two stops. Discrete Contin Dyn Syst Ser B. 2009;12(1):23–38.
  • Kuttler KL, Purcell JV, Shillor M. Analysis and simulations of a contact problem for a nonlinear dynamic beam with a crack. Quart J Mech Appl Math. 2012;65:1–25.
  • Shillor M, Sofonea M, Telega JJ. Models and analysis of quasistatic contact, lecture notes in physics. Berlin: Springer; 2004.
  • Strömberg N, Johansson L, Klarbring A. Derivation and analysis of a generalized standard model for contact, friction and wear. Int J Solids Struct. 1996;33(13):1817–1836.
  • Taylor ME. Partial differential equations. New York: Springer-Verlag; 1996. (Texts in applied mathematics; vol. 23).
  • Kuttler K. Modern analysis. Boca Raton (FL): CRC Press; 1998.
  • Renardy M, Rogers RC. An introduction to partial differential equations. 2nd ed. New York: Springer-Verlag; 2004. (Texts in applied mathematics; vol. 13).
  • Atkinson K, Han W. Theoretical numerical analysis. 3rd ed. Dordrecht: Springer; 2010. (Texts in applied mathematics).
  • Clarke FH. Optimization and nonsmooth analysis. New York: Wiley Interscience; 1983.
  • Huang H, Han W, Zhou J. The regularization method for an obstacle problem. Numer Math. 1994;69:155–166.
  • Lions JL. Quelques methods de resolution des problémes aux limites non linéaires. English ed. Dunod: Springer-Verlag; 1969.
  • Simon J. Compact sets in the space Lp(0,T;B). Ann Mat Pura Appl. 1987;146:65–96.
  • Migórski S. Hemivariational inequality for a frictional contact problem in elasto-piezoelectricity. Discrete Contin Dyn Syst Ser B. 2006;6(6):1339–1356.
  • Sofonea M, Migórski S. A class of history-dependent variational-hemivariational inequalities. Nonlinear Differ Equ Appl. 2016;23(3).38

Reprints and Corporate Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

To request a reprint or corporate permissions for this article, please click on the relevant link below:

Order Reprints Request Corporate Permissions

Academic Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

Obtain permissions instantly via Rightslink by clicking on the button below:

Request Academic Permissions

If you are unable to obtain permissions via Rightslink, please complete and submit this Permissions form. For more information, please visit our Permissions help page.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.