Lyapunov type functions for classes of autonomous parabolic feedback control problems and applications

Abstract In this note we provide sufficient conditions for the existence of a Lyapunov function for a class of parabolic feedback control problems. The results are applied to the long-time behavior of state functions for the following problems: (i) a model of combustion in porous media; (ii) a model of conduction of electrical impulses in nerve axons; and (iii) a climate energy balance model.

[1]  P. Kasyanov,et al.  Regularity of Weak Solutions and Their Attractors for a Parabolic Feedback Control Problem , 2013 .

[2]  P. Kasyanov,et al.  On Global Attractors for Autonomous Damped Wave Equation with Discontinuous Nonlinearity , 2014 .

[3]  Viorel Barbu,et al.  Differential equations in Banach spaces , 1976 .

[4]  G. Łukaszewicz,et al.  Global attractors for multivalued semiflows with weak continuity properties , 2013, 1307.3487.

[5]  P. O. Kas’yanov,et al.  Solutions of Cauchy and periodic problems for evolution inclusions with multi-valued wλ0-pseudomonotone maps , 2010 .

[6]  On Regularity of All Weak Solutions and Their Attractors for Reaction-Diffusion Inclusion in Unbounded Domain , 2014 .

[7]  John M. Ball,et al.  GLOBAL ATTRACTORS FOR DAMPED SEMILINEAR WAVE EQUATIONS , 2003 .

[8]  P. Kasyanov,et al.  Regular solutions and global attractors for reaction-diffusion systems without uniqueness , 2014 .

[9]  P. Kasyanov,et al.  Uniform trajectory attractor for non-autonomous reaction–diffusion equations with Carathéodory’s nonlinearity , 2014 .

[10]  W. D. Evans,et al.  PARTIAL DIFFERENTIAL EQUATIONS , 1941 .

[11]  J. Norbury,et al.  Some existence, uniqueness and nonuniqueness theorems for solutions of parabolic equations with discontinuous nonlinearities , 1991, Proceedings of the Royal Society of Edinburgh: Section A Mathematics.

[12]  Jesús A. Hernández,et al.  Some results about multiplicity and bifurcation of stationary solutions of a reaction diffusion climatological model , 2002 .

[13]  P. Kasyanov,et al.  Long-Time Behaviour of Solutions for Autonomous Evolution Hemivariational Inequality with Multidimensional “Reaction-Displacement” Law , 2012 .

[14]  A. V. Kapustyan,et al.  On the connectedness and asymptotic behaviour of solutions of reaction–diffusion systems☆ , 2006 .

[15]  José Valero,et al.  Dynamics of a Reaction-diffusion equation with a Discontinuous Nonlinearity , 2006, Int. J. Bifurc. Chaos.

[16]  M. Z. Zgurovsky,et al.  Evolution Inclusions and Variation Inequalities for Earth Data Processing I , 2011 .

[17]  G. Łukaszewicz,et al.  Attractors for Navier–Stokes flows with multivalued and nonmonotone subdifferential boundary conditions , 2013, 1307.3496.

[18]  J. Valero Attractors of Parabolic Equations Without Uniqueness , 2001 .

[19]  P. Kasyanov,et al.  Structure of Uniform Global Attractor for General Non-Autonomous Reaction-Diffusion System , 2014 .

[20]  P. Kasyanov,et al.  Multivalued Dynamics of Solutions for Autonomous Operator Differential Equations in Strongest Topologies , 2014 .

[21]  Michael Z. Zgurovsky,et al.  Long-time behavior of solutions for quasilinear hyperbolic hemivariational inequalities with application to piezoelectricity problem , 2012, Appl. Math. Lett..

[22]  P. Kasyanov Multivalued dynamics of solutions of autonomous operator differential equations with pseudomonotone nonlinearity , 2012 .

[23]  M. Budyko The effect of solar radiation variations on the climate of the Earth , 1969 .

[24]  P. Kasyanov,et al.  Structure and regularity of the global attractor of a reaction-di{\S}usion equation with non-smooth nonlinear term , 2012, 1209.2010.

[25]  D. Terman A free boundary arising from a model for nerve conduction , 1985 .