Advanced search
Publication Cover
Complex Variables and Elliptic Equations
An International Journal
Volume 68, 2023 - Issue 12
Submit an article Journal homepage
37
Views
0
CrossRef citations to date
0
Altmetric
Research Article

Strongly elliptic differential-difference equations with mixed boundary conditions in a bounded domain

V. V. LiikoMoscow Center for Fundamental and Applied Mathematics, Lomonosov Moscow State University, Peoples' Friendship University of Russia (RUDN University), Moscow, RussiaCorrespondence[email protected]
View further author information
Pages 2034-2058 | Received 25 Sep 2021, Accepted 30 Jun 2022, Published online: 20 Jul 2022

References

  • Hartman P, Stampacchia G. On some non-linear elliptic differential-functional equations. Acta Math. 1976;115:271–310.
  • Antonevich AB. The index and the normal solvability of a general elliptic boundary value problem with a finite group of shifts on the boundary. Differ Uravn. 1972;8(2):309–317. English transl. in: Differential Equations. 1974;8.
  • Rabinovich VS. On the solvability of differential-difference equations on Rn and in a half-space. Dokl Akad Nauk SSSR. 1978;243(5):1134–1137. English transl. in: Soviet Math. Dokl. 1978;19.
  • Onanov GG, Skubachevskii AL. Differential equations with displaced arguments in stationary problems in the mechanics of a deformed body. Prikl Mekh. 1979;15:39–47. English transl. in: Soviet Applied Mech. 1979;15.
  • Onanov GG, Tsvetkov EL. On the minimum of the energy functional with respect to functions with deviating argument in a stationary problem of elasticity theory. Russ J Math Phys. 1995;3(4):491–500.
  • Skubachevskii AL. Elliptic functional differential equations and applications. Basel: Birkhäuser Verlag; 1997. (Operator theory: advances and applications; vol. 91).
  • Skubachevskii AL. Bifurcation of periodic solutions for nonlinear parabolic functional differential equations arising in optoelectronics. Nonlinear Anal. 1998;32(2):261–278.
  • Skubachevskii AL. Boundary-value problems for elliptic functional-differential equations and their applications. Uspekhi Mat Nauk. 2016;71(5(431)):3–112. English transl. in: Russian Math. Surveys 2016;71(5):801–906.
  • Bitsadze AV, Samarskii AA. Some elementary generalizations of linear elliptic boundary-value problems. Dokl Akad Nauk SSSR. 1969;185(4):734–740. English. transl. in: Soviet. Math. Dokl. 1969;10.
  • Browder F. Non-local elliptic boundary value problems. Am J Math. 1964;86(4):735–750.
  • Carleman T. Sur la théoreie des équations intégrales et ses applications [On the theory of integral equations and their applications]. Verhandlungen Kongreß Zürich. 1932;1:138–151. French.
  • Kato T. Fractional powers of dissipative operators. J Math Soc Japan. 1964;13(3):246–274.
  • Skubachevskii AL. On a class of functional-differential operators satisfying the Kato conjecture. Algebra i Analiz. 2018;30(2):249–273. English transl. in: St. Petersburg Math. J. 2019;30:329–346.
  • Skubachevskii AL. Elliptic differential-difference operators with degeneration and the Kato square root problem. Math Nachr. 2018;291:2660–2692.
  • Skubachevskii AL. The first boundary value problem for strongly elliptic differential-difference equations. J Differ Equ. 1986;63:332–361.
  • Skubachevskii AL, Tsvetkov EL. The second boundary value problem for elliptic differential-difference equations. Differ Uravn. 1989;25(10):1766–1766. English transl. in: Differ. Equ. 1989;25(10).
  • Neverova DA. Regularity of solutions to the Robin problem for differential-difference equations. Complex Var Elliptic Equ. 2022;67(2):478–499. DOI:10.1080/17476933.2020.1833872
  • Neverova DA. Smoothness of generalized solutions of the Neumann problem for a strongly elliptic differential-difference equation on the boundary of adjacent subdomains. SMFN. 2020;66(2):272–291.
  • Rossovskii LE. Elliptic functional differential equations with contractions and extensions of independent variables of the unknown function. SMFN. 2014;54:3–138.English transl. in: J. Math. Sci. 2017;223(4):351–493.
  • Rossovskii LE, Tasevich AL. Unique solvability of a functional-differential equation with orthotropic contractions in weighted spaces. Differ Uravn. 2017;53(12):1679–1692. English transl. in: Diff. Equations. 2017;53(12):1631–1644..
  • Rossovskii LE. Elliptic functional differential equations with incommensurable contractions. Math Model Nat Phenom. 2017;12(6):226–239.
  • Skubachevskii AL. Elliptic differential-difference equations with degeneration. Tr MMO. 1998;59:240–285. English transl. in: Trans. Moscow Math. Soc. 1998 Amer. Math. Soc., Providence, RI, 1998, 217–256.
  • Popov VA. Elliptic functional differential equations with degeneration. Lobachevskii J Math. 2020;41(5):869–894.
  • Muravnik AB. On the Dirichlet problem for differential-difference elliptic equations in a half-space. J. Math Sci. 2018;235(4):473–483.
  • Muravnik AB. Elliptic problems with nonlocal potential arising in models of nonlinear optics. Mat Zametki. 2019;105(5):747–762. English transl. in: Math. Notes. 2019;105(5):734–746.
  • Muravnik AB. Elliptic differential-difference equations in the half-space. Mat Zametki. 2020;108(5):764–770. English transl. in: Math. Notes. 2020;108(5):727–732..
  • Solonukha OV. On a nonlinear nonlocal problem of elliptic type. Zh Vychisl Mat Mat Fiz. 2017;57(3):417–428.English transl. in: Comput. Math. Math, Phys. 2017;57(3):422–433.
  • Solonukha OV. On an elliptic differential-difference equation with nonsymmetric shift operator. Mat Zametki. 2018;104(4):604–620. English transl. in: Math. Notes. 2018;104(4):572–586.
  • Solonukha OV. Generalized solutions of quasilinear elliptic differential-difference equations. Zh Vychisl Mat Mat Fiz. 2020;60(12):2085–2097. English transl. in: Comput. Math. Math. Phys. 2020;60(12):2019–2031.
  • Liiko VV, Skubachevskii AL. Mixed problems for strongly elliptic differential-difference equations in a cylinder. Mat Zametki. 2020;107(5):693–716. English transl. in: Mathem. Notes. 2020;107(5):770–790.
  • Liiko VV. Mixed boundary value problem for strongly elliptic differentail difference equaions in a bounded domain. Russ J Math Phys. 2021;28(2):270–274.
  • Liiko VV, Skubachevskii AL. Smoothness of solutions to the mixed problem for elliptic differential-difference equation in cylinder. Complex Var Elliptic Equ. 2022;67(2):462–477. DOI:10.1080/17476933.2020.1833871
  • Eskin G. Boundary value problems for elliptic pseudodifferential equations. Nauka, M. 1973. English transl. in: AMS, Providence, RI. 1981.
  • Ibragimov AI. Some qualitative properties of the solutions of a mixed problem for elliptic equations in nonsmooth domains. Dokl Akad Nauk SSSR. 1982;265(1):27–31.
  • Ibragimov AI. Solvability of a mixed problem for second-order elliptic equations. Differ Uravn. 1983;19(1):56–65.
  • Skubachevskii AL. Regularity of solutions of a nonlocal elliptic problem. Russ J Math Phys. 2001;8(3):365–374.

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.