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On the existence of infinitely many periodic solutions for an equation of a rectangular thin plate

Eduard Feireisl (1987)

Czechoslovak Mathematical Journal

On the existence of periodic solutions of a semilinear wave equation with a superlinear forcing term

Eduard Feireisl (1988)

Czechoslovak Mathematical Journal

On the existence of periodic solutions of an hyperbolic equation in a thin domain

Russell Johnson, Mikhail Kamenskii, Paolo Nistri (1997)

Atti della Accademia Nazionale dei Lincei. Classe di Scienze Fisiche, Matematiche e Naturali. Rendiconti Lincei. Matematica e Applicazioni

For a nonlinear hyperbolic equation defined in a thin domain we prove the existence of a periodic solution with respect to time both in the non-autonomous and autonomous cases. The methods employed are a combination of those developed by J. K. Hale and G. Raugel and the theory of the topological degree.

On the existence of positive solutions for periodic parabolic sublinear problems.

Godoy, T., Kaufmann, U. (2003)

Abstract and Applied Analysis

On the existence of two-dimensional invariant tori for scalar parabolic equations with time periodic coefficients

E. N. Dancer (1991)

Annali della Scuola Normale Superiore di Pisa - Classe di Scienze

On the instability of a class of periodic travelling wave solutions of the modified Boussinesq equation.

Arruda, Lynnyngs Kelly (2010)

International Journal of Mathematics and Mathematical Sciences

On the long time behaviour of solutions of a class of autonomous reaction-diffusion systems.

Büger, M. (1998)

Acta Mathematica Universitatis Comenianae. New Series

On the solvability of a system of wave and beam equations.

Berkovits, Juha (2001)

Abstract and Applied Analysis

On the time periodic free boundary associated to some nonlinear parabolic equations.

Badii, M., Díaz, J.I. (2010)

Boundary Value Problems [electronic only]

On the weakly nonlinear wave equation involving a small parameter at the highest derivative

Marie Kopáčková (1969)

Czechoslovak Mathematical Journal

On unique solvability of the periodic problem in the plane for linear hyperbolic equations.

Kiguradze, T. (1997)

Memoirs on Differential Equations and Mathematical Physics

One-dimensional symmetry of periodic minimizers for a mean field equation

Chang-Shou Lin, Marcello Lucia (2007)

Annali della Scuola Normale Superiore di Pisa - Classe di Scienze

We consider on a two-dimensional flat torus $T$ defined by a rectangular periodic cell the following equation $Δ u + ρ (\frac{e^{u}}{\int_{T} e^{u}} - \frac{1}{| T |}) = 0, \int_{T} u = 0 .$ It is well-known that the associated energy functional admits a minimizer for each $ρ \leq 8 π$ . The present paper shows that these minimizers depend actually only on one variable. As a consequence, setting $λ_{1} (T)$ to be the first eigenvalue of the Laplacian on the torus, the minimizers are identically zero whenever $ρ \leq min {8 π, λ_{1} (T) | T |}$ . Our results hold more generally for solutions that are Steiner symmetric, up to a translation....

Oscillatory and periodic solutions to a diffusion equation of neutral type.

Wiener, Joseph, Heller, William (1999)

International Journal of Mathematics and Mathematical Sciences

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