References
- Benia Y, Sadallah B-K. Existence of solutions to Burgers equations in a non-parabolic domain. Electron J Differ Equ. 2018;20:1–13. Available from: https://ejde.math.txstate.edu/Volumes/2018/20/benia.pdf
- Benia Y, Sadallah B-K. A semilinear problem related to Burgers' equation. Appl Anal. 2023;102(3):938–957. doi: 10.1080/00036811.2021.1967331
- Jenaliyev M, Ramazanov M, Yergaliyev M. On the coefficient inverse problem of heat conduction in a degenerating domain. Appl Anal. 2020;99(6):1026–1041. doi: 10.1080/00036811.2018.1518523
- Jenaliyev M, Ramazanov M, Yergaliyev M. On an inverse problem for a parabolic equation in a degenerate angular domain. Eurasian Math J. 2021;12:25–39.
- Jenaliyev M, Yergaliyev M, Assetov A. On one initial boundary value problem for the Burgers equation in a rectangular domain. Bull Karaganda Univ Math Ser. 2021;104(4):74–88. doi: 10.31489/2518-7929
- Jenaliyev MT, Assetov AA, Yergaliyev MG. On the solvability of the Burgers equation with dynamic boundary conditions in a degenerating domain. Lobachevskii J Math. 2021;42(15):3661–3674. doi: 10.1134/S199508022203012X
- Dkhil F, Hamza MA, Mannoubi B. Asymptotic profiles for a class of perturbed Burgers equations in one space dimension. Opusc Math. 2018;38(1):41–80. doi: 10.7494/OpMath.2018.38.1.41
- Hasan MT, Xu C. The stability and convergence of time-stepping/spectral methods with asymptotic behaviour for the Rosenau-Burgers equation. Appl Anal. 2020;99(12):2013–2025. doi: 10.1080/00036811.2018.1553034
- Chen Y, Zhang T. A weak Galerkin finite element method for Burgers' equation. J Comput Appl Math. 2019;348:103–119. doi: 10.1016/j.cam.2018.08.044
- Lions J-L, Magenes E. Problemes aux limites non homohenes et apllications. Vol. 1. Paris: Dunod; 2003.
- Adams RA, Fournier JJF. Sobolev spaces. 2nd ed. Amsterdam: Elsevier; 2003.