Advanced search
Publication Cover
Applicable Analysis
An International Journal
Volume 96, 2017 - Issue 10: Integral equations and inverse problems
Submit an article Journal homepage
250
Views
19
CrossRef citations to date
0
Altmetric
Articles

A fractional Tikhonov method for solving a Cauchy problem of Helmholtz equation

Zhi QianDepartment of Mathematics, Nanjing University, Nanjing, China.Correspondence[email protected]
View further author information
&
Xiaoli FengSchool of Mathematics and Statistics, Xidian University, Xi’an, China.View further author information
Pages 1656-1668 | Received 11 Sep 2016, Accepted 25 Oct 2016, Published online: 06 Nov 2016

References

  • Klann E, Ramlau R. Regularization by fractional filter methods and data smoothing. Inverse Prob. 2008;24:025018, 26pp.
  • Hochstenbach ME, Reichel L. Fractional Tikhonov regularization for linear discrete ill-posed problems. BIT Numer Math. 2011;51:197–215.
  • Bianchi D, Buccini A, Donatelli M, et al. Iterated fractional Tikhonov regularization. Inverse Prob. 2015;31:055005, 34pp.
  • Lavrentev MM, Romanov VG, Shishatski SP. Ill-posed problems of mathematical physics and analysis. Vol. 64, Translations of mathematical monographs. Providence (RI): American Mathematical Society; 1986.
  • Tikhonov AN, Arsenin VY. Solutions of Ill-posed problems. Washington (DC): Winston; 1977.
  • Gorenflo R. Funktionentheoretische Bestimmung des Aussenfeldes zu einer zweidimensionalen magnetohydrostatischen Konfiguration. Z Angew Math Phys. 1965;16:279–290.
  • Colli-Franzone P, Magenes E. On the inverse potential problem of electrocardiology. Calcolo. 1979;16:459–538.
  • Johnson CR. Computational and numerical methods for bioelectric field problems. Crit Rev Biomed Eng. 1997;25:1–81.
  • Alessandrini G. Stable determination of a crack from boundary measurements. Proc R Soc Edinburgh A. 1993;123:497–516.
  • Regińska T, Regiński K. Approximate solution of a Cauchy problem for the Helmholtz equation. Inverse Prob. 2006;22:975–989.
  • Fu CL, Feng XL, Qian Z. The Fourier regularization for solving the Cauchy problem for the Helmholtz equation. Appl Numer Math. 2009;59:2625–2640.
  • Fu CL, Ma YJ, Zhang YX, et al. An a posteriori regularization for the Cauchy problem for the Helmholtz equation with inhomogeneous Neumann data. Appl Math Model. 2015;39:4103–4120.
  • Qin HH, Wei T. Two regularization methods for the Cauchy problems of the Helmholtz equation. Appl Math Model. 2010;34:947–967.
  • Zhang YX, Fu CL, Deng ZL. An a posteriori truncation method for some Cauchy problems associated with Helmholtz-type equations. Inverse Prob Sci Eng. 2013;21:1151–1168.
  • Feng XL, Fu CL, Cheng H. A regularization method for solving the Cauchy problem for the Helmholtz equation. Appl Math Model. 2011;35:3301–3315.
  • Kong YF, Li ZP, Xiong XT. An inverse diffraction problem: shape reconstruction. East Asian J Appl Math. 2015;5:342–360.
  • Qin HH, Wei T, Shi R. Modified Tikhonov regularization method for the Cauchy problem of the Helmholtz equation. J Comput Appl Math. 2009;224:39–53.
  • Xiong XT, Fu CL. Two approximate methods of a Cauchy problem for the Helmholtz equation. Comput Appl Math. 2007;26:285–307.
  • Qian AL, Xiong XT, Wu YJ. On a quasi-reversibility regularization method for a Cauchy problem of the Helmholtz equation. J Comput Appl Math. 2010;233:1969–1979.
  • Qin HH, Wei T. Modified regularization method for the Cauchy problem of the Helmholtz equation. Appl Math Model. 2009;33:2334–2348.
  • Xiong XT. A regularization method for a Cauchy problem of the Helmholtz equation. J Comput Appl Math. 2010;233:1723–1732.
  • Regińska T, Wakulicz A. Wavelet moment method for the Cauchy problem for the Helmholtz equation. J Comput Appl Math. 2009;223:218–229.
  • Regińska T, Tautenhahn U. Conditional stability estimates and regularization with applications to Cauchy problems for the Helmholtz equation. Numer Funct Anal Optim. 2009;30:1065–1097.
  • Cheng H, Zhu P, Gao J. An iterative regularization method to solve the Cauchy problem for the Helmholtz equation. Math Prob Eng. 2014: ID 917972, 9pp.
  • Berntsson F, Kozlov VA, Mpinganzima L, et al. An accelerated alternating procedure for the Cauchy problem for the Helmholtz equation. Comput Math Appl. 2014;68:44–60.
  • Berntsson F, Kozlov VA, Mpinganzima L, et al. An alternating iterative procedure for the Cauchy problem for the Helmholtz equation. Inverse Prob Sci Eng. 2014;22:45–62.
  • Wei T, Qin HH, Shi R. Numerical solution of an inverse 2D Cauchy problem connected with the Helmholtz equation. Inverse Prob. 2008;24:035003, 18pp.
  • Engl HW, Hanke M, Neubauer A. Regularization of inverse problems. Boston (MA): Kluwer; 1996.
  • Kirsch A. An Introduction to the mathematical theory of inverse problems. Berlin: Springer-Verlag; 1996.
  • Qian Z, Hon Y, Xiong X. Numerical solution of two-dimensional radially symmetric inverse heat conduction problem. J Inverse Ill-posed Prob. 2015;23:121–134.

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.