ON CAUCHY PROBLEM FOR FIRST-ORDER PARTIAL DIFFERENTIAL EQUATION AND ITS APPLICATIONS IN INVERSION THEORY

The inverse coefficient problem for the second-order operator in the simply connected domain with the piecewise-smooth boundary arising in the theory of the deformable system vibrations is investigated. The solution method for the inverse coefficient problem based on studying Cauchy problem for the first-order differential equation with variable coefficients is offered. Both direct and inverse problems are solved on the ground of the difference approximations method. The reconstruction of the variable shear modulus of various types, obtained at both accurate and noisy input data, is resulted.

Cauchy problem, inverse coefficient problem, difference schemes.

1. Vatulyan, A.O. Obratnyye zadachi v mekhanike deformiruyemogo tverdogo tela. [Inverse problems in deformable solid mechanics.] Moscow: Fizmatlit, 2007, 223 p. (in Russian).

2. Isakov, V. Inverse Problems for Partial Differential Equations. Berlin: Springer, 2005, 262 p.

3. Bocharova, О.V., Vatulyan, A.O. O rekonstruktsii plotnosti i modulya Yunga dlya neodnorodnogo sterzhnya. [On density reconstruction and Young’s modulus for homogeneous spindle.] Akusticheskiy zhurnal, 2009, vol. 55, no. 3, pp. 275–282 (in Russian).

4. Vatulyan, A.O. K teorii obratnykh koeffitsiyentnykh zadach v lineynoy mekhanike deformiruyemogo tela. [On theory of inverse coefficient problems in linear mechanics of solids.] Prikladnaya matematika i mekhanika, 2010, no. 6, pp. 911–918 (in Russian).

5. Gyunter, N.M. Integrirovaniye uravneniy pervogo poryadka v chastnykh proizvodnykh. [Integration of first-order equations in partial derivatives.] Moscow; Leningrad: Gostekhizdat, 1934, 359 p. (in Russian).

6. Vatulyan, A.O., Bobrova, A.N. Ob opredelenii zakona izmeneniya modulya Yunga pri analize prodolnykh kolebaniy sterzhnya. [On law definition of Young’s modulus variation under analysis of longitudinal rod oscillations.] Vestnik of Don State Tech. University, 2009, vol. 9, no. 4, pp. 613–621 (in Russian).

7. Vatulyan, A.O., Buryan, A.Y., Osipov, A.V. Ob identifikatsii peremennoy zhestkosti pri analize poperechnykh kolebaniy balki. [On identification of variable rigidity under the analysis of the bean lateral oscillations.] Vestnik of Don State Tech. University, 2010, vol. 10, no. 6, pp. 825–833 (in Russian).

8. Filippov, A.P. Kolebaniya deformiruyemykh sistem. [Oscillations of deformable systems.] 2nd redaction. Moscow: Mashinostroyeniye, 1970, 736 p. (in Russian).

9. Fedoryuk, M.V. Obyknovennyye differentsialnyye uravneniya. [Ordinary differential equations.] Moscow: Nauka, 1985, 448 p. (in Russian).

10. Samarskiy, A.A. Vvedeniye v teoriyu raznostnykh skhem. [Introduction to difference scheme theory.] Moscow: Nauka, 1971, 552 p. (in Russian).

11. Ahlberg, J., Nilson, E., Walsh, J. Teoriya splaynov i yeye prilozheniya. [The theory of splines and their applications.] Moscow: Mir, 1972, 316 p. (in Russian).

12. Abramovits, M., Stigan, I., eds. Spravochnik po spetsialnym funktsiyam. [Reference guide in special functions.] Moscow: Nauka, 1979, 831 p. (in Russian).