References
- Choulli M. An inverse problem for a semilinear parabolic equation. Inverse Prob. 1994;10:1123–1132.
- Isakov V. Some inverse problems for the diffusion equation. Invserse prob. 1999;15:3–10.
- Prilepko AI, Kostin AB. On certain inverse problems for parapolic equations with final and integral observations. Russ Acad. Sci. Sb. Math. 1993;75:473–490.
- Prilepko AI, Solov’ev VV. Solvability of the inverse boundary-value problem of finding a coefficient of a lower-order derivative in a parabolic equation. Differ. Equ. 1987;23:101–107.
- Trucu D, Ingham DB, Lesnic D. Space-dependent perfusion coefficient identification in the transient bio-heat equation. J. Eng. Math. 2010;67:307–315.
- Isakov V. Inverse problems for partial differential equations. New York (NY): Springer; 1998.
- Gutman S. Identification of discontinuous parameters in flow equations. SIAM J. Control Optim. 1990;28:1049–1060.
- Keung YL, Zou J. Numerical identifications of parameters in parabolic equations. Inverse Prob. 1998;14:83–100.
- Jiang LS, Chen Q, Wang L, Zhang JE. A new well-posed algorithm to recover implied local volatility. Quant. Finance. 2003;3:451–457.
- Jiang LS, Tao YS. Identifying the volatility of underlying assets from option prices. Inverse Prob. 2001;17:137–155.
- Isakov V. Inverse parabolic problems with the final overdetermination. Comm. Pure Appl. Math. 1991;44:185–209.
- Beilina L, Klibanov MV. Approximate global convergence and adaptivity for coefficient inverse problem. New York (NY): Springer; 2012.
- Bukhgeim AL, Klibanov MV. Uniqueness in the large of a class of multidimensional inverse problems. Sov. Math. Dokl. 1981;17:244–247.
- Fu CL, Xiong XT, Qian Z. Fourier regularization for a backward heat equation. J. Math. Anal. Appl. 2007;331:472–480.
- Mera NS. The method of fundamental solutions for the backward heat conduction problem. Inverse Prob. Sci. Eng. 2005;13:65–78.
- Mera NS, Elliott L, Ingham DB, Lesnic D. An iterative boundary element method for solving the one-dimensional backward heat conduction problem. Int. J. Heat Mass Trans. 2001;44:1937–1946.
- Liu CS. Group preserving scheme for backward heat conduction problems. Int. J. Heat Mass Trans. 2004;47:2567–2576.
- Ames KA, Epperson JF. A kernel-based method for the approximate solution of backward parabolic problems. SIAM J. Numer. Anal. 1997;34:1357–1390.
- Clark GW, Oppenheimer SF. Quasireversibility methods for non-well-posed problems. Electron. J. Diff. Equ. 1994;1994:1–9.
- Showalter RE. The final value problem for evolution equations. J. Math. Anal. Appl. 1974;47:563–572.
- Hào DN, Duc NV, Sahli H. A non-local boundary value problem method for parabolic equations backward in time. J. Math. Anal. Appl. 2008;345:805–815.
- Hào DN. A mollification method for ill-posed problems. Numer. Math. 1994;68:469–506.
- Xiong XT, Fu CL, Qian Z. Two numerical methods for solving a backward heat conduction problem. Appl. Math. Comput. 2006;179:370–377.
- Kirkup SM, Wadsworth M. Solution of inverse diffusion problems by operator-splitting methods. Appl. Math. Model. 2002;26:1003–1018.
- Choulli M, Yamamoto M. Generic well-posedness of an inverse parabolic problem-the Hölder space approach. Inverse Prob. 1996;12:195–205.
- Rundell W. The determination of a parabolic equation from initial and final data. Pro. AMS. 1987;99:637–642.
- Prilepko AI, Orlovsky DG, Vasin IA. Methods for solving inverse problems in mathematical physics; Vol. 1, New York (NY): Marcel Dekker; 2000.
- Tadi M, Klibanov MV, Cai W. An inversion method for parabolic equations based on quasireversibility. Comput. Math. Appl. 2002;43:927–941.
- Chen Q, Liu JJ. Solving an inverse parabolic problem by optimization from final measurement data. J. Comput. Appl. Math. 2006;193:183–203.
- Yang L, Yu JN, Deng ZC. An inverse problem of identifying the coefficient of parabolic equation. Appl. Math. Modell. 2008;32:1984–1995.
- Watson LT. Globally convergent homotopy methods: A tutorial. Appl. Math. Comput. 1989;31:369–396.
- Davidenko D. On a new method of numerically integrating a system of nonlinear equations. Doklady Akad. Nauk SSSR. 1953;88:601–604.
- Smale S. Convergent processes of price adjustment and global Newton methods. J. Math. Eco. 1976;3:1–14.
- Chow SN, Mallet-Paret J, Yorke JA. Finding zeroes of maps: homotopy methods that are constructive with probability one. Math. Comput. 1978;32:887–899.
- Choulli M, Yamamoto M. An inverse parabolic problem with non zero initial condition. Inverse Prob. 1997;13:19–27.
- Fan CM, Chan HF, Kuo CL, Yeih W. Numerical solutions of boundary detection problems using modified collocation Trefftz method and exponentially convergent scalar homotopy algorithm. Eng. Anal. Boundary Elem. 2012;36:2–8.
- Fan CM, Chan HF. Modified collocation Trefftz method for the geometry boundary identification problem of heat conduction. Numer. Heat Transfer, Part B: Fundam. 2011;59:58–75.
- Fan CM, Liu CS, Yeih W, Chan HF. The scalar homotopy method for solving non-linear obstacle problem. Compu. Materials Continua. 2010;15:67–86.
- Liu CS. An optimal tri-vector iterative algorithm for solving ill-posed linear inverse problems. Inverse Prob. Sci. Eng. 2013;21:650–681.
- Klibanov MV, Thành NT. Recovering of dielectric constants of explosives via a globally strictly convex cost functional. 2014. Preprint is available online at www.arxiv.org, arxiv: 1408.0583v1 [math-ph].
- Friedman A. Partial differential equations of parabolic type. Englewood Cliffs (NJ): Prentice-Hall Inc.;1964. p. 56–69.
- Zhao JJ, Liu T, Liu SS. An adaptive homotopy method for permeability estimation of a nonlinear diffusion equation. Inverse Prob. Sci. Eng. 2013;21:585–604.