References
- Tikhonov, AN, and Arsenin, VYa, 1977. Solutions of Ill-posed Problems. New York: Halsted Press; 1977.
- Morozov, VA, 1984. Methods for Solving Incorrectly Posed Problems. New York: Springer-Verlag; 1984.
- Engl, HW, and Groetsch, CW, 1987. Inverse and Ill-posed Problems. Orlando: Academic Press; 1987.
- Silvey, SD, 1980. Optimal Design. An Introduction to the Theory for Parameter Estimation. London: Chapman and Hall; 1980.
- Pukelsheim, F, 1993. Optimal Design of Experiments. New York: J. Wiley & Sons, Inc.; 1993.
- Fedorov, VV, and Hackl, P, 1997. Model-oriented Design of Experiments. New York: Springer-Verlag; 1997.
- Uspenskii, AB, and Fedorov, VV, 1974. Experiment planning in inverse problems of mathematical physics, Kibernetika 4 (1974), pp. 123–128.
- Kuszta, B, and Sinha, NK, 1978. Design of optimal input signals for the identification of distributed parameter systems, International Journal of Systematic Science 9 (1978), pp. 1–7.
- Artyukhin, EA, and Okhapkin, AS, 1984. Parametric analysis of the accuracy of solution of a nonlinear inverse problem of recovering the thermal conductivity of a composite material, J. Eng. Phys. Thermophys. 45 (1984), pp. 1275–1281.
- Sun, NZ, and Yen, WG, 1990. Coupled inverse problems in groundwater modeling. Identifiability and experimental design, Water Resources Research 26 (1990), pp. 2527–2540.
- Taktak, R, Beck, JV, and Scott, E, 1993. Optimal experimental design for estimating thermal properties of composite materials, International Journal of Heat Mass Transfer 36 (1993), pp. 2977–2986.
- Emery, AF, and Nenarokomov, AV, 1998. Optimal experimental design, Meas. Sci. Technol. 9 (1998), pp. 864–876.
- Dowding, KJ, and Blackwell, BF, 2000. "Design of experiments to estimate temperature dependent thermal properties". In: Inverse Problem in Engineering. Theory and Practice. New York: ASME; 2000. pp. 509–518.
- Romanovskii, MR, 1990. Planning an experiment for mathematical model identification, J. Eng. Phys. Thermophys. 58 (1990), pp. 1018–1026.
- Romanovskii, MR, 1993. Experimental design method with general assumptions about the form of the model of the experimental object, Industrial Laboratory 59 (1993), pp. 89–96.
- Romanovskii, MR, 1989. Mathematical modeling of experiments with the help of inverse problems, J. Eng. Phys. Thermophys. 57 (1989), pp. 1112–1117, (Consultants Bureau, New York, USA).
- Romanovskii, MR, 1982. Inverse problem regularization under the scheme of separate matching with observation, J. Eng. Phys. Thermophys. 42 (1982), pp. 110–117.
- Romanovskii, MR, 1983. Investigation of regularization of heat-exchange parameters estimation, J. Eng. Phys. Thermophys. 44 (1983), pp. 801–809.
- Romanovskii, MR, 1980. Regularization of inverse problems, High Temperature 18 (1980), pp. 135–140.
- Alifanov, OM, Artyukhin, EA, and Rumyantsev, SV, 1995. Extreme Methods for Solving Ill-posed Problems with Applications to Inverse Problems. Wallinford, UK: Begell House, ; 1995.
- Romanovkii, MR, 1982. Uniqueness of the solution of the inverse problem for the coefficients of the linear heat conduction equation, J. Eng. Phys. Thermophys. 42 (1982), pp. 351–357.