Smoothness of inertial manifolds

Finite-dimensional behavior in dissipative partial differential equations, Invariant manifolds of traveling waves of the 3D Gross-Pitaevskii equation in the energy space, A finite difference scheme for computing inertial manifolds, Large time behavior of a conserved phase-field system, Some closure results for inertial manifolds, Centre manifolds for stochastic evolution equations, Sufficient conditions for the continuity of inertial manifolds for singularly perturbed problems, Inertial manifold and state estimation of dissipative nonlinear PDE systems, Center manifolds for infinite dimensional nonautonomous differential equations, Pullback attractors for 2D Navier-Stokes equations with delays and the flattening property, Pullback attractors for the non-autonomous 2D Navier-Stokes equations for minimally regular forcing, Unnamed Item, Center manifolds for rough partial differential equations, Smoothness of invariant manifolds and foliations for infinite dimensional random dynamical systems, Attractors. Then and now, Persistence of \(C^1\) inertial manifolds under small random perturbations, Smooth extensions for inertial manifolds of semilinear parabolic equations, The Cahn–Hilliard equation as limit of a conserved phase-field system, On the behavior of attractors under finite difference approximation, A concise proof of the geometric construction of inertial manifolds, Arbitrarily accurate approximate inertial manifolds of fixed dimension., Estimates on the distance of inertial manifolds, Existence and continuity of inertial manifolds for the hyperbolic relaxation of the viscous Cahn-Hilliard equation, Frequency theorem for parabolic equations and its relation to inertial manifolds theory, Inertial manifolds: The non-self-adjoint case, Generalizations of SRB measures to nonautonomous, random, and infinite dimensional systems, Perturbations of normally hyperbolic manifolds with applications to the Navier-Stokes equations, STOCHASTIC INERTIAL MANIFOLDS FOR DAMPED WAVE EQUATIONS, \(C^{1,\theta }\)-estimates on the distance of inertial manifolds, Distance of attractors of reaction-diffusion equations in thin domains, Inertial manifolds for a Smoluchowski equation on the unit sphere, Invariant manifolds of competitive selection-recombination dynamics, Persistence of invariant sets for dissipative evolution equations, Inertial manifolds and normal hyperbolicity, Approximation theories for inertial manifolds, Spatiotemporal pattern extraction by spectral analysis of vector-valued observables, Inertial manifolds for dynamics of cells coupled by gap junction, A Hartman-Grobman theorem for the Cahn-Hilliard and phase-field equations, The phase dynamics method with applications to the Swift-Hohenberg equation

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• Inertial manifolds associated to partly dissipative reaction-diffusion systems
• Explicit construction of an inertial manifold for a reaction diffusion equation
• Invariant manifolds for flows in Banach spaces
• Exponential tracking and approximation of inertial manifolds for dissipative nonlinear equations
• Hopf's conjecture for a class of chemical kinetics equations
• Inertial manifolds for the Kuramoto-Sivashinsky equation and an estimate of their lowest dimension
• Spectral barriers and inertial manifolds for dissipative partial differential equations
• Approximate inertial manifolds for reaction-diffusion equations in high space dimension
• Center manifolds and contractions on a scale of Banach spaces
• Inertial manifolds for nonlinear evolutionary equations
• Geometric theory of semilinear parabolic equations
• Infinite-dimensional dynamical systems in mechanics and physics
• Integral manifolds and inertial manifolds for dissipative partial differential equations
• Some global dynamical properties of a class of pattern formation equations
• Finite-dimensional attracting manifolds in reaction-diffusion equations
• Some remarks on the smoothness of inertial manifolds
• C^k centre unstable manifolds
• Finite-dimensional asymptotic behavior for the Swift-Hohenberg model of convection
• Low-dimensional behaviour in the complex Ginzburg-Landau equation
• Approximation theories for inertial manifolds
• Induced trajectories and approximate inertial manifolds