On the existence, uniqueness and regularity of solutions to the phase-field system with a general regular potential and a general class of nonlinear and non-homogeneous boundary conditions

Abstract This paper studies a Caginalp phase-field transition system endowed with a general regular potential, as well as a general class, in both unknown functions, of nonlinear and non-homogeneous (depending on time and space variables) boundary conditions. We first prove the existence, uniqueness and regularity of solutions to the Allen–Cahn equation, subject to the nonlinear and non-homogeneous dynamic boundary conditions. The existence, uniqueness and regularity of solutions to the Caginalp system in this new formulation are also proved. This extends previous works concerned with regular potential and nonlinear boundary conditions, allowing the present mathematical model to better approximate the real physical phenomena, especially phase transitions.

[1]  Sergey Zelik,et al.  Exponential attractors for the Cahn–Hilliard equation with dynamic boundary conditions , 2005 .

[2]  C. M. Elliott,et al.  Global Existence and Stability of Solutions to the Phase Field Equations , 1990 .

[3]  S. Gatti,et al.  Existence of global solutions to the Caginalp phase-field system with dynamic boundary conditions and singular potentials , 2008 .

[4]  J. F. Bloweyl,et al.  A phase-field model with a double obstacle potential , 1994 .

[5]  Jacques-Louis Lions,et al.  Control of distributed singular systems , 1985 .

[6]  Paul C. Fife,et al.  Thermodynamically consistent models of phase-field type for the kinetics of phase transitions , 1990 .

[7]  Tommaso Benincasa,et al.  A Product Formula Approach to a Nonhomogeneous Boundary Optimal Control Problem Governed by Nonlinear Phase-field Transition System , 2011, J. Optim. Theory Appl..

[8]  W. Gangbo,et al.  Degree Theory in Analysis and Applications , 1995 .

[9]  D. Motreanu,et al.  A Generalized Phase-Field System☆ , 1999 .

[10]  Lishang Jiang,et al.  Optimal control of a phase field model for solidification , 1992 .

[11]  Evolution systems of nonlinear variational inequalities arising from phase change problems , 1994 .

[12]  Gunduz Caginalp,et al.  Convergence of the phase field model to its sharp interface limits , 1998, European Journal of Applied Mathematics.

[13]  Harald Garcke,et al.  Finite Element Approximation of the Cahn-Hilliard Equation with Degenerate Mobility , 1999, SIAM J. Numer. Anal..

[14]  O. A. Ladyzhenskai︠a︡,et al.  Linear and Quasi-linear Equations of Parabolic Type , 1995 .