References
- Pulkina LS. On one class of nonlocal problems and their connection with inverse problems. Proceedings of the Third All-Russia Scientific Conference. Part 3. Differential Equations and Boundary Value Problems. Math. Modeling and Boundary Value Problems. Samara, Russia; 2006. p.190–192. Russian.
- Troitski VA, Petukhov LV. Optimization of the form of elastic bodies. Moscow: Nauka; 1982. Russian.
- Prilepko AI, Kostin AB. On certain inverse problems for parabolic equations with final and integral observation. Russ. Acad Sci. Sbornik. Math. 1993;75:473–490.
- Savateev EG. On the problem of identification of a coefficient in a parabolic equation. Siber. Math. J. 1995;36:160–167.
- Kabanikhin SI. Inverse and Ill-posed problems: theory and applications. Germany: De Gruyter; 2011.
- Akhundov AY. Some inverse problems for strong parabolic systems. Ukrain. Math. J. 2006;58:127–138.
- Ivanchov MI. The inverse problem of determining the heat source power for a parabolic equation under arbitrary boundary conditions. J. Math. Sci. 1998;88:432–436.
- Cannon JR, Duchateau P. Structural identification of an unknown source term in a heat equation. Inverse Probl. 1998;14:535–551.
- Fatullayev AG. Numerical solution of the inverse problem of determining an unknown source term in a two-dimensional heat equation. Appl. Math. Comput. 2004;152:659–666.
- Liu C-S. An two-stage LGSM to identify time dependent heat source through an internal measurement of temperature. Int. J. Heat Mass Transfer. 2009;52:1635–1642.
- Liu C-S. A Lie-group shooting method for reconstructing a past time-dependent heat source. Int. J. Heat Mass Transfer. 2012;55:1773–1781.
- Yang L, Deng Z-C, Yu J-N, Luo G-W. Optimization method for the inverse problem of reconstructing the source term in a parabolic equation. Math. Comput. Simul. 2009;80:314–326.
- Yang F, Fu CL. Two regularization methods to identify time-dependent heat source through an internal measurement of temperature. Math. Comput. Modell. 2011;53:793–804.
- Yang F, Guo HZ, Li XX. The method of central difference for the inverse time-dependent heat source problem. Appl. Math. Comput. 2011;218:3025–3034.
- Yan L, Fu CL, Yang FL. The method of fundamental solutions for the inverse heat source problem. Eng. Anal. Boundary Elements. 2008;32:216–222.
- Farcas A, Lesnic D. The boundary-element method for the determination of a heat source dependent on one variable. J. Eng. Math. 2006;54:375–388.
- Johansson T, Lesnic D. Determination of a spacewise dependent heat source. J. Comput. Appl. Math. 2007;209:66–80.
- Johansson T, Lesnic D. A variational method for identifying a spacewise-dependent heat source. IMA J. Appl. Math. 2007;72:748–760.
- Ling L, Yamamoto M, Hon YC. Identification of source locations in two-dimensional heat equations. Inverse Probl. 2006;22:1289–1305.
- Ismailov MI, Kanca F, Lesnic D. Determination of a time-dependent heat source under nonlocal boundary and integral overdetermination conditions. Appl. Math. Comput. 2011;218:4138–4146.
- Hasanov A. Identification of spacewise and time dependent source terms in 1D heat conduction equation from temperature measurement at a final time. Int. J. Heat Mass Transfer. 2012;55:2069–2080.
- Hasanov A. An inverse source problem with single Dirichlet type measured output data for a linear parabolic equation. Appl. Math. Lett. 2011;24:1269–1273.
- Hasanov A, Otelbaev M, Akpayev B. Inverse heat conduction problems with boundary and final time measured output data. Inverse Probl. Sci. Eng. 2011;19:895–1006.
- Ahmadabadi MN, Arab M, Maalek Ghaini FM. The method of fundamental solutions for the inverse space-dependent heat source problem. Eng. Anal. Bound. Elem. 2009;33:1231–1235.
- Nakhushev AM. Equations of mathematical biology. Moscow: Vysshaya Shkola; 1995. Russian.
- Abramov AA. On the transfer of boundary conditions for systems of ordinary linear differential equations (a variant of the dispersive method). USSR Comput. Math. Math. Phys. 1962;1:617–622.
- Samarskii AA. Theory of difference schemes. New York: Marcel Dekker; 2001.
- Schiesser WE. The numerical method of lines: integration of partial differential equations. San Diego, CA: Academic Press; 1991.
- Abdullayev VM. On application of method of lines for a boundary problem involving non-local conditions with respect to a loaded parabolic equation. Proc. ANAS. PTMS Series. 2008;28(3):76–81. Russian.
- Ayda-zade KR. Numerical method of identification of dynamic system parameters. J. Inv. Ill-Posed Probl. 2005;13:201–211.
- Aida-zade KR. On numerical solution to systems of differential equations involving nonlocal conditions. J. Comput. Technol. 2004;9:11–25. Russian.
- Aida-zade KR, Rahimov AB. Solution to some nonlocal and inverse problems for parabolic equations. Proc. ANAS. PTMS series. 2012;32:89–98. Russian.