Generalized Laplace Transform Based on the Differentiation Operator With Piecewise Constant Coefficients

The paper develops the theory of matrix integral Fourier transforms based on a differential operator with piecewise constant matrix coefficients. The definition of the matrix Fourier transform is given, its properties and applications to the modeling of interrelated wave processes in piecewise homogeneous media are studied. An inversion formula for the matrix integral Fourier transform is proved. Significant differences from the scalar case are revealed. A technique for applying the matrix Fourier transform to solving interrelated mixed boundary value problems for systems of hyperbolic differential equations with matrix piecewise constant coefficients is developed. A solution is found for the vector analog of the problem of wave propagation in
an infinite string with two regions of different density. A vector analogue of the d’Alembert formula is found. A solution is obtained for a mixed initial-boundary value problem for a system of differential equations of parabolic type, which describes an 𝑛 component model of an interconnected process of heat and mass transfer in a two-layer media.

1. I. I. Bavrin, O. E. Yaremko, Transformation Operators and Boundary Value Problems, Differ. Uravn., 40:8 (2004), 1085–1095.

2. Gantmakher F. R. Theory of matrices. New York: Chelsea Pub. Co. 1959.

3. I. T. Efimova, “A certain class of singular problems that can be solved by means of special integral transformations with respect to cylindrical functions”, Differ. Uravn., 8:5 (1972), 817–822.

4. V. A. I’lin, d’Alembert-type formula for transverse oscillations of an infinite rod consisting of two segments with different densities, Dokl. Math., 80:1 (2009), 624–626.

5. V. A. I’lin, A d’Alembert-type formula for longitudinal oscillations of an infinite rod consisting of two segments with different densities and elasticities, Dokl. Math., 80:1 (2009), 613–615.

6. E. M. Kartashov, Analytical approaches to the analysis of unsteady heat conduction for partially bounded regions, TVT, 58:3 (2020), 402–411.

7. Yu. M. Kolyano, B. V. Protsyuk, B. A. Drapkin, “The Green function for spatial stationary problems of heat conduction of a multilayer body”, Differ. Uravn., 28:3 (1992), 524–527.

8. S. V. Leksina. Initial Value Problems for System of Wave Equations, Vestn. Samar. Gos. Tekhn. Univ., Ser. Fiz.-Mat. Nauki, 1(18) (2009), 280–282.

9. M. P. Lenyuk. An integral Fourier transform on a piecewise-inhomogeneous half-line. Soviet Math. (Iz. VUZ), 33:5, 1989, 19–24 pp.

10. A.V, Lykov. Teoriia teploprovodnosti [Theory of heat conduction]."Moscow, Vysshaia shkola publ. (1967).

11. Lykov A.V. Teoriya sushki [Drying theory], Moscow: Energy, 1968, 472 p. (In Russ.)

12. Marchenko, V.A. Sturm-Liouville Operators and Their Applications. Naukova Dumka, Kiev English Trans Birkhauser, Basel. 1977.

13. A. N. Tikhonov, A. A. Samarskii. Equations of Mathematical Physics.Dover Publications. 2011. P.800.

14. Ya. S. Uflyand, Correct solution of the nonstationary convective diffusion-problems in cylinders Zhurnal Tekhnicheskoi Fiziki, 57:2 (1987), 398–400 pp.

15. Yaremko, O.E. Matrix integral Fourier transforms for problems with discontinuous coefficients and transformation operators. Dokl. Math. 76, 876–878 (2007).

16. Griffiths G.; Schiesser W.E. Traveling Wave Analysis of Partial Differential Equations. Numerical and Analytical Methods with Matlab and Maple. Academic Press.2010, P.461.

17. Legua, M.P., Morales, I., S´anchez Ruiz, L.M. The Heaviside Step Function and MATLAB. Computational Science and Its Applications – ICCSA 2008. vol 5072. Springer.

18. Polyanin A. D., Manzhirov, A. V. Handbook of Integral Equations, Boca Raton. 1998. CRC Press.

19. Sitnik Sergei M., Yaremko Oleg, Yaremko Natalia. Transmutation Operators and Applications. Transmutation Operators Boundary Value Problems, Springer Nature Switzerland, P.447-466, 2020.