1, whenever ||Λ α jt||">

Stability for semilinear parabolic equations with noninvertible linear operator (original) (raw)

1985, Pacific Journal of Mathematics

Suppose that x'(t)+Ax(ί) = /(*,*(<)), ί>0, is a semϋinear parabolic equation, e~A l is bounded and / satisfies the usual continuity condition. If for some 0<ω<l, 0<a<l, aωp > 1, γ>i, ||/"^e-/ "|| < C, ί > 1, whenever ||Λ α jt|| 4-||x|| is small enough, then for small initial data there exist stable global solutions. Moreover, if the space is reflexive then their limit states exist. Some theorems that are useful for obtaining the above bounds and some examples are also presented.

Sign up for access to the world's latest research.

checkGet notified about relevant papers

checkSave papers to use in your research

checkJoin the discussion with peers

checkTrack your impact

Stability results for a class of non-linear parabolic equations

Ann Mat Pur Appl, 1977

We study the asymptotic behaviour o] the solutions o/ the equation ut = Au + + ~u-lu]~u. Denoting by ~o the principal eigenvalue o] the second.order di]ferential operator A, we shall prove that if ). ~ )~ the only equilibrium solution, namely zero, is asymptotically stable, whereas, i] 2 > 20, the nontrivial equilibrium solutions without internal zeros are asymptotically stable. Attraetivity and stability are proved both in the L~.norm and in the H~-norm.

On stabilization of the solutions of parabolic equations with small parameter

Proceedings of the National Academy of Sciences, 1984

We consider two classes of quasi-linear parabolic equations depending on a small parameter E. The asymptotic behavior of the solutions as t -X00 and E -O 0 is investigated by studying the associated Markov family. We find its dependence on the way t and E 1 go to infinity and on the initial point.

A Sufficient Condition for Slow Decay of a Solution to a Semilinear Parabolic Equation

Analysis and Applications, 2012

On considere l'équation ψ t − ∆ψ + c|ψ| p−1 ψ = 0 avec les conditions aux limites de Neumann dans un ouvert connexe borné de R n avec p > 1, c > 0 . On montre que si la donnée initiale est petite en norme L ∞ et si sa moyenne dépasse en valeur absolue un certain multiple de la puissance p de sa norme L ∞ , alors ψ(t, ·) décroit comme t − 1 (p−1) .

Loading...

Loading Preview

Sorry, preview is currently unavailable. You can download the paper by clicking the button above.