Non-isothermal phase transition models with Neumann boundary conditions.
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Publication:1395838
DOI10.1016/S0362-546X(03)00032-4zbMath1036.35068MaRDI QIDQ1395838
Akio Ito, Nobuyuki Kenmochi, Masahiro Kubo
Publication date: 1 July 2003
Published in: Nonlinear Analysis. Theory, Methods \& Applications. Series A: Theory and Methods (Search for Journal in Brave)
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Related Items (10)
On a conserved Penrose-Fife type system. ⋮ Asymptotic uniform boundedness of energy solutions to the Penrose-Fife model ⋮ The conserved Penrose-Fife system with temperature-dependent memory. ⋮ Well-posedness for an extended Penrose-Fife phase-field model with energy balance supplied by Dirichlet boundary conditions ⋮ The Penrose-Fife phase-field model ⋮ Periodic solutions of non-isothermal phase separation models with constraint ⋮ Asymptotic behavior of the solution to the non-isothermal phase separation ⋮ Asymptotic behavior of the solution to the non-isothermal phase field equation ⋮ Nonlinear degenerate parabolic equations with Neumann boundary condition ⋮ A non-isothermal phase separation with constraints and Dirichlet boundary condition for temperature
Cites Work
- Thermodynamically consistent models of phase-field type for the kinetics of phase transitions
- Gobal existence for a thermodynamically consistent model of phase field type
- Nonlinear system for non-isothermal diffusive phase separation
- Evolution equations associated with non-isothermal phase separation: Subdifferential approach
- Evolution equations generated by subdifferentials in the dual space of \((H^1(\Omega))\)
- Hysteresis and phase transitions
- Viscosity approach to modelling non-isothermal diffusive phase separation
- Neumann problems for a class of nonlinear degenerate parabolic equations
- On The Coupled Cahn-hilliard Equations
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