Stability, instability and center manifold theorem for fully nonlinear autonomous parabolic equations in Banach space
Copyright policy )Stability, instability and center manifold theorem for fully nonlinear autonomous parabolic equations in Banach space
The authors study fully nonlinear equations of parabolic type. They deal with stability, instability and saddle points of an equilibrium and establish the existence of an attracting local center manifold.
- University of Pisa Italy
- Scuola Normale Superiore Italy
- University of Parma Italy
Asymptotic behavior of solutions to PDEs, fully nonlinear, existence, saddle points, stability, equilibrium, 510, instability, Dynamical systems and ergodic theory, Nonlinear parabolic equations, Initial value problems for second-order parabolic equations, attracting local center manifold
Asymptotic behavior of solutions to PDEs, fully nonlinear, existence, saddle points, stability, equilibrium, 510, instability, Dynamical systems and ergodic theory, Nonlinear parabolic equations, Initial value problems for second-order parabolic equations, attracting local center manifold
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