Document Zbl 07597397

Wen, Jin; Liu, Zhuan-Xia; Yue, Chong-Wang; Wang, Shi-Juan

Landweber iteration method for simultaneous inversion of the source term and initial data in a time-fractional diffusion equation. (English) Zbl 07597397

J. Appl. Math. Comput. 68, No. 5, 3219-3250 (2022).

MSC:

65-XX	Numerical analysis
35R11	Fractional partial differential equations
41A28	Simultaneous approximation
65N21	Numerical methods for inverse problems for boundary value problems involving PDEs

Keywords:

time-fractional diffusion equation; conditional stability; Landweber iteration; simultaneous inversion; a priori and a posteriori parameter choice rules

Cite Review PDF

Full Text: DOI

References:

[1]	Cannon, JR; Zachmann, D., Parameter determination in parabolic partial differential equations from overspecified boundary data, Int. J. Eng. Sci., 20, 6, 779-788 (1982) · Zbl 0485.35083 · doi:10.1016/0020-7225(82)90087-8
[2]	Chadan, K.; Colton, D.; Päivärinta, L.; Rundell, W., An Introduction to Inverse Scattering and Inverse Spectral Problems. SIAM Monographs on Mathematical Modeling and Computation (1997), Philadelphia: Society for Industrial and Applied Mathematics (SIAM), Philadelphia · Zbl 0870.35121 · doi:10.1137/1.9780898719710
[3]	Chen, CS; Fan, CM; Wen, PH, The method of approximate particular solutions for solving elliptic problems with variable coefficients, Int. J. Comput. Methods, 8, 3, 545-559 (2011) · Zbl 1245.65172 · doi:10.1142/S0219876211002484
[4]	Dien, NM; Trong, DD, The backward problem for nonlinear fractional diffusion equation with time-dependent order, Bull. Malays. Math. Sci. Soc., 44, 5, 3345-3359 (2021) · Zbl 1471.35328 · doi:10.1007/s40840-021-01113-y
[5]	Engl, HW; Hanke, M.; Neubauer, A., Regularization of Inverse Problems, Volume 375 of Mathematics and Its Applications (1996), Dordrecht: Kluwer Academic Publishers Group, Dordrecht · Zbl 0859.65054 · doi:10.1007/978-94-009-1740-8
[6]	Floridia, G.; Li, ZY; Yamamoto, M., Well-posedness for the backward problems in time for general time-fractional diffusion equation, Atti Accad. Naz. Lincei Rend. Lincei Mat. Appl., 31, 3, 593-610 (2020) · Zbl 1460.35374 · doi:10.4171/rlm/906
[7]	Floridia, G.; Yamamoto, M., Backward problems in time for fractional diffusion-wave equation, Inverse Probl., 36, 12, 125016, 14 (2020) · Zbl 1456.35205 · doi:10.1088/1361-6420/abbc5e
[8]	Jin, BT; Rundell, W., An inverse problem for a one-dimensional time-fractional diffusion problem, Inverse Probl., 28, 7, 075010, 19 (2012) · Zbl 1247.35203 · doi:10.1088/0266-611/28/7/075010
[9]	Johansson, BT; Lesnic, D., A variational method for identifying a spacewise-dependent heat source, IMA J. Appl. Math., 72, 6, 748-760 (2007) · Zbl 1135.65034 · doi:10.1093/imamat/hxm024
[10]	Johansson, BT; Lesnic, D., A procedure for determining a spacewise dependent heat source and the initial temperature, Appl. Anal., 87, 3, 265-276 (2008) · Zbl 1133.35436 · doi:10.1080/00036810701858193
[11]	Kirsch, A., An Introduction to the Mathematical Theory of Inverse Problems, Volume 120 of Applied Mathematical Sciences (1996), New York: Springer, New York · Zbl 1456.35001 · doi:10.1007/978-3-030-63343-1
[12]	Lesnic, D.; Elliott, L., The decomposition approach to inverse heat conduction, J. Math. Anal. Appl., 232, 82-98 (1999) · Zbl 0922.35189 · doi:10.1006/jmaa.1998.6243
[13]	Li, DF; Liao, HL; Sun, WW; Wang, JL; Zhang, JW, Analysis of \(L1\)-Galerkin FEMs for time-fractional nonlinear parabolic problems, Commun. Comput. Phys., 24, 1, 86-103 (2018) · Zbl 1488.65431 · doi:10.4208/cicp.OA-2017-0080
[14]	Li, DF; Sun, WW; Wu, CD, A novel numerical approach to time-fractional parabolic equations with nonsmooth solutions, Numer. Math. Theory Methods Appl., 14, 2, 355-376 (2021) · Zbl 1488.65256 · doi:10.4208/nmtma.OA-2020-0129
[15]	Li, GS; Zhang, D.; Jia, XZ; Yamamoto, M., Simultaneous inversion for the space-dependent diffusion coefficient and the fractional order in the time-fractional diffusion equation, Inverse Probl., 29, 6, 065014, 36 (2013) · Zbl 1281.65125 · doi:10.1088/0266-5611/29/6/065014
[16]	Liu, JJ; Yamamoto, M., A backward problem for the time-fractional diffusion equation, Appl. Anal., 89, 11, 1769-1788 (2010) · Zbl 1204.35177 · doi:10.1080/00036810903479731
[17]	Liu, JJ; Yamamoto, M.; Yan, L., On the uniqueness and reconstruction for an inverse problem of the fractional diffusion process, Appl. Numer. Math., 87, 1-19 (2015) · Zbl 1302.65215 · doi:10.1016/j.apnum.2014.08.001
[18]	Liu, JJ; Yamamoto, M.; Yan, LL, On the reconstruction of unknown time-dependent boundary sources for time fractional diffusion process by distributing measurement, Inverse Probl., 32, 1, 015009, 25 (2016) · Zbl 1332.35397 · doi:10.1088/0266-5611/32/1/015009
[19]	Luc, M.; Yamamoto, M., Coefficient inverse problem for a fractional diffusion equation, Inverse Probl., 29, 7, 075013, 8 (2013) · Zbl 1278.35268 · doi:10.1088/0266-5611/29/7/075013
[20]	Metzler, R., Klafter, J.: The random walk’s guide to anomalous diffusion: a fractional dynamics approach. Phys. Rep. 339(1), 1-77 (2000). doi:10.1016/S0370-1573(00)00070-3 · Zbl 0984.82032
[21]	Metzler, R.; Klafter, J., Subdiffusive transport close to thermal equilibrium: from the Langevin equation to fractional diffusion, Phys. Rev. E, 61, 6, 6308-6311 (2000) · doi:10.1103/PhysRevE.61.6308
[22]	Nabil, S., Fairouz, Z.: A modified Tikhonov regularization method for a class of inverse parabolic problems. An. Ştiinţ. Univ. “Ovidius” Constanţa Ser. Mat. 28(1), 181-204 (2020). doi:10.2478/auom-2020-0013 · Zbl 1488.35627
[23]	Pazy, A., Semigroups of Linear Operators and Applications to Partial Differential Equations. Applied Mathematical Sciences (1983), New York: Springer, New York · Zbl 0516.47023
[24]	Podlubny, I.: Fractional Differential Equations, Volume 198 of Mathematics in Science and Engineering. Academic Press, Inc., San Diego (1999). An introduction to fractional derivatives, fractional differential equations, to methods of their solution and some of their applications · Zbl 0924.34008
[25]	Raberto, M.; Scalas, E.; Mainardi, F., Waiting-times and returns in high-frequency financial data: an empirical study, Phys. A Stat. Mech. Appl., 314, 1, 749-755 (2002) · Zbl 1001.91033 · doi:10.1016/S0378-4371(02)01048-8
[26]	Ren, C.; Xu, X.; Lu, S., Regularization by projection for a backward problem of the time-fractional diffusion equation, J. Inverse Ill Posed Probl., 22, 1, 121-139 (2014) · Zbl 1282.65114 · doi:10.1515/jip-2011-0021
[27]	Ruan, ZS; Yang, ZJ; Lu, XL, Tikhonov regularisation method for simultaneous inversion of the source term and initial data in a time-fractional diffusion equation, East Asian J. Appl. Math., 5, 3, 273-300 (2015) · Zbl 1457.65086 · doi:10.4208/eajam.310315.030715a
[28]	Ruan, ZS; Yang, ZJ; Lu, XL, An inverse source problem with sparsity constraint for the time-fractional diffusion equation, Adv. Appl. Math. Mech., 8, 1, 1-18 (2016) · Zbl 1488.65383 · doi:10.4208/aamm.2014.m722
[29]	Ruan, ZS; Zhang, W.; Wang, ZW, Simultaneous inversion of the fractional order and the space-dependent source term for the time-fractional diffusion equation, Appl. Math. Comput., 328, 365-379 (2018) · Zbl 1427.65228 · doi:10.1016/j.amc.2018.01.025
[30]	Rundell, W.; Xu, X.; Zuo, LH, The determination of an unknown boundary condition in a fractional diffusion equation, Appl. Anal., 92, 7, 1511-1526 (2013) · Zbl 1302.35412 · doi:10.1080/00036811.2012.686605
[31]	Wang, JG; Wei, T., An iterative method for backward time-fractional diffusion problem, Numer. Methods Partial Differ. Equ., 30, 6, 2029-2041 (2014) · Zbl 1314.65120 · doi:10.1002/num.21887
[32]	Wang, LY; Liu, JJ, Data regularization for a backward time-fractional diffusion problem, Comput. Math. Appl., 64, 11, 3613-3626 (2012) · Zbl 1268.65128 · doi:10.1016/j.camwa.2012.10.001
[33]	Wei, T.; Zhang, ZQ, Reconstruction of a time-dependent source term in a time-fractional diffusion equation, Eng. Anal. Bound. Elem., 37, 1, 23-31 (2013) · Zbl 1351.35267 · doi:10.1016/j.enganabound.2012.08.003
[34]	Wei, T.; Zhang, ZQ, Stable numerical solution to a Cauchy problem for a time fractional diffusion equation, Eng. Anal. Bound. Elem., 40, 128-137 (2014) · Zbl 1297.65115 · doi:10.1016/J.ENGANABOUND.2013.12.002
[35]	Xiong, XT; Wang, JX; Li, M., An optimal method for fractional heat conduction problem backward in time, Appl. Anal., 91, 4, 823-840 (2012) · Zbl 1238.35179 · doi:10.1080/00036811.2011.601455
[36]	Yang, L.; Deng, ZC; Hon, YC, Simultaneous identification of unknown initial temperature and heat source, Dyn. Syst. Appl., 25, 4, 583-602 (2016) · Zbl 1362.35337
[37]	Yang, F.; Ren, YP; Li, XX; Li, DG, Landweber iterative method for identifying a space-dependent source for the time-fractional diffusion equation, Bound. Value Probl., 163, 19 (2017) · Zbl 1386.35470 · doi:10.1186/s13661-017-0898-2
[38]	Yang, F.; Zhang, Y.; Li, XX, Landweber iterative method for identifying the initial value problem of the time-space fractional diffusion-wave equation, Numer. Algorithms, 83, 4, 1509-1530 (2020) · Zbl 07191904 · doi:10.1007/s11075-019-00734-6
[39]	Yuste, S.B., Acedo, L., Lindenberg, K.: Reaction front in an a + b \(\rightarrow\) c reaction-subdiffusion process. Phys. Rev. E 69(3), 036126 (2004). doi:10.1103/PhysRevE.69.036126
[40]	Yuste, S.B., Lindenberg, K.: Subdiffusion-limited reactions. Chem. Phys. 284(1), 169-180 (2002). Strange Kinetics. doi:10.1016/S0301-0104(02)00546-3
[41]	Zhang, Y.; Xu, X., Inverse source problem for a fractional diffusion equation, Inverse Probl., 27, 3, 035010, 12 (2011) · Zbl 1211.35280 · doi:10.1088/0266-5611/27/3/035010

This reference list is based on information provided by the publisher or from digital mathematics libraries. Its items are heuristically matched to zbMATH identifiers and may contain data conversion errors. In some cases that data have been complemented/enhanced by data from zbMATH Open. This attempts to reflect the references listed in the original paper as accurately as possible without claiming completeness or a perfect matching.