Geodesic
Boundary control for a pseudo-parabolic equation
Matematičeskie zametki SVFU, Tome 25 (2018) no. 2, pp. 40-47 Cet article a éte moissonné depuis la source Math-Net.Ru

Voir la notice de l'article

Previously, a mathematical model for the following problem was considered. On a part of the border of the region $\Omega\subset\mathbb{R}^3$ there is a heater with controlled temperature. It is required to find such a mode of its operation that the average temperature in some subregion $D$ of $\Omega$ reaches some given value. In this paper, we consider a similar boundary control problem associated with a pseudo-parabolic equation on a segment. On the part of the border of the considered segment, the value of the solution with control parameter is given. Restrictions on the control are given in such a way that the average value of the solution in some part of the considered segment gets a given value. The auxiliary problem is solved by the method of separation of variables, while the problem in consideration is reduced to the Volterra integral equation of the second kind. By Laplace transform method, the existence and uniqueness theorems for admissible control are proved.
Mots-clés : pseudo-parabolic equation, Laplace transform.
Keywords: boundary control, control parameter, Volterra integral equation 
@article{SVFU_2018_25_2_a3,
     author = {Z. K. Fayazova},
     title = {Boundary control for a pseudo-parabolic equation},
     journal = {Matemati\v{c}eskie zametki SVFU},
     pages = {40--47},
     year = {2018},
     volume = {25},
     number = {2},
     language = {ru},
     url = {http://geodesic.mathdoc.fr/item/SVFU_2018_25_2_a3/}
}
TY  - JOUR
AU  - Z. K. Fayazova
TI  - Boundary control for a pseudo-parabolic equation
JO  - Matematičeskie zametki SVFU
PY  - 2018
SP  - 40
EP  - 47
VL  - 25
IS  - 2
UR  - http://geodesic.mathdoc.fr/item/SVFU_2018_25_2_a3/
LA  - ru
ID  - SVFU_2018_25_2_a3
ER  - 
%0 Journal Article
%A Z. K. Fayazova
%T Boundary control for a pseudo-parabolic equation
%J Matematičeskie zametki SVFU
%D 2018
%P 40-47
%V 25
%N 2
%U http://geodesic.mathdoc.fr/item/SVFU_2018_25_2_a3/
%G ru
%F SVFU_2018_25_2_a3
Z. K. Fayazova. Boundary control for a pseudo-parabolic equation. Matematičeskie zametki SVFU, Tome 25 (2018) no. 2, pp. 40-47. http://geodesic.mathdoc.fr/item/SVFU_2018_25_2_a3/

[1] Coleman B. D., Noll W., “An approximation theorem for functionals, with applications in continuum mechanics”, Arch. Rational Mech. Anal., 6 (1960), 355–370 | DOI | MR | Zbl

[2] Bernard D., Coleman R., Duffin J., Mizel V. J., “Instability, uniqueness, and nonexistence theorems for the equation on a strip”, Arch. Rat. Mech. Anal., 19:2 (1965), 100–116 | DOI | MR | Zbl

[3] Lyashko S. I., “On solvability of pseudoparabolic equations”, Sov. Math., 29:9 (1985), 99–101 | MR | Zbl

[4] Lyashko S. I., Mankovskii A. A., “Optimum pulse control for a distributed parameter system of hyperbolic type”, Dokl. Akad. Nauk Ukr. SSR, Ser. A, 1983, no. 4, 69–71 | Zbl

[5] Lyashko S. I., Mankovskii A. A., “Simultaneous optimization of momentum moments and pulse intensities in control problems for parabolic equations”, Kibernetika, 1983, no. 3, 81–82

[6] White L. W., “Point control: approximations of parabolic problems and pseudoparabolic problems”, Appl. Anal., 12 (1981), 251–263 | DOI | MR | Zbl

[7] Lions J.-L., Contrôle optimal de systèmes gouvernés par des équations aux dérivées partielles, Dunod Gauthier-Villars, Paris, 1968 | MR

[8] Fursikov A. V., “Feedback stabilization for 2D-seen equations: additional remarks”, Control and estimation of distributed parameter systems. Intern. Ser. Numer. Math., 143 (2002), 169–187, Birkhäuser, Basel

[9] Il'in V. A., “Boundary control by the oscillation process at two ends in terms of the generalized solution of the wave equation with finite energy”, Differ. Equ., 36:11 (2000), 1513–1528 | MR | MR | Zbl | Zbl

[10] Il'in V. A., Moiseev V. I., “Optimization of boundary controls of string vibration”, Russ. Math. Surv., 60:6 (2005), 89–114 | DOI | MR | Zbl

[11] Fattorini H. O., “Time and norm optimal control for linear parabolic equations: necessary and sufficient conditions”, Control and estimation of distributed parameter system. Intern. Ser. Numer. Math., 143 (2002), 151–168

[12] Barbu V., Râşcanu A., Tessitore G., “Carleman estimates and controllability of linear stochastic heat equation”, Appl. Math. Optim., 47:2 (2003), 97–120 | DOI | MR | Zbl

[13] Albeverio S., Alimov Sh., “On a time-optimal control problem associated with the heat exchange process”, Appl. Math. Optim., 57:1 (2008), 58–68 | DOI | MR | Zbl

[14] Alimov Sh., “On the time optimal control problem associated with heat exchange”, Dokl. Uzbek Akad. Nauk, 2006, no. 1

[15] Tikhonov A. N., Samarskii A. A., Equations of Mathematical Physics, Nauka, Moscow, 1966 | MR