Existence and uniqueness solution of a class of quasilinear parabolic boundary control

M. H. Farag; T. A Talaat; E. M Kamal

Ayuda

Existence and uniqueness solution of a class of quasilinear parabolic boundary control

M. H Farag ^[1] ; T. A Talaat ^[1] ; E. M Kamal ^[1]
1. [1] Minia University
  
  Minia University
  
  Egipto
Localización: Cubo: A Mathematical Journal, ISSN 0716-7776, ISSN-e 0719-0646, Vol. 15, Nº. 2, 2013, págs. 111-119
Idioma: inglés
DOI: 10.4067/S0719-06462013000200011
Enlaces
- Texto completo
Resumen
- español
  Este artículo presenta un control óptimo de procesos descritos por un sistema parabólico cuasilineal con control en los coeficientes de la ecuación, en la condición de frontera y en el lado derecho de esta ecuación. Se investigan los teoremas relacionados con la existencia y unicidad para la solución del problema considerado.
- English
  This paper presents an optimal control of processes described by a quasilinear parabolic systems with controls in the coefficients of equation, in the boundary condition and in the right side of this equation. Theorems concarning the existence and uniqueness for the solution of the cosidering problem are invistigated.
Referencias bibliográficas
- Chun-fa, Li,Yang, Xue,Feng, En-min. (2008). Optimal control problem governed by semilinear parabolic equation and its algorithm. Acta Mathematicae...
- Lashin, D. A. (2009). on the existence of optimal control of temperature regimes. J. of Math. Sciences. 158.
- Chryssoverghi, I. Mixed discretization-optimization methods for relaxed optimal control of nonlinear parabolic systems. Proc. of 6th WSEAS...
- Farag, M. H. (3003). On the derivation of discrete conjugate boundary value problem for an optimal control parabolic problem. New Zeal J....
- Gardashov, T. B. (1991). Solution of inverse problems for the quasilinear heat conduction equation for the multidimensional case. J. Engrg....
- Iskenderov, A. D,Tagiev, R. K. (1983). Optimization problems with controls in coefficients of parabolic equations. Differentsialnye Uravneniya....
- Farag, M. H. (2006). A stability theorem for constrained optimal control problems. Journal of Computational Mathematics. 22. 635-640
- Farag, M. H. (2009). Computing optimal control with a quasilinear parabolic partial differential equation. Surveys in Mathematics and its...
- Tikhonov, A. N,Arsenin, N. Ya. (1974). Methods for the solution of incorrectly posed problems. Nauka. Moscow.
- Murat, F. (1977). Contre-examples pour dives problems ou le controle intervient dans les coefficients. Ann. Mat. Pure Appl. 112. 49-68
- Ladyzhenskaya, O. A,Solonnikov, V. A,Ural'tseva, N. N. (1976). Linear and quasilinear parabolic equations. Nauka. Moscow.
- Ladyzhenskaya, O. A. (1973). Boundary value problems of mathematical physics. Nauka. Moscow.
- Mikhailov, V. P. (1983). Partial differential equations. Nauka. Moscow.
- Krabs, W. (1979). Optimization and Approximation. Wiley. ^eNew York New York.
- Yosida, K. (1967). Functional analysis. Mir. Moscow.
- Goebel, M. (1979). On existence of optimal control. Math. Nuchr. 93. 67-73