Zobrazeno 1 - 7
of 7
pro vyhledávání: '"J. E. Munoz Rivera"'
Publikováno v:
SIAM Journal on Control and Optimization. 59:2174-2194
We study the semigroup associated to the Euler--Bernoulli beam equation with localized (discontinuous) dissipation. We assume that the beam is composed of three components: elastic, viscoelastic of...
Publikováno v:
Applied Mathematics & Optimization. 84:1045-1081
We consider different models of thermoelastic plates in a bounded reference configuration: with Fourier heat conduction or with the Cattaneo model, and with or without inertial term. Some models exhibit exponential stability, others are not exponenti
Publikováno v:
Applied Mathematics Letters. 98:63-69
In this paper we study the decay rates of the solutions for a Schrodinger equation with double power nonlinearity in L p ( R ) -norm for 2 p ≤ ∞ . We give some numerical examples to illustrate our analytical results.
Publikováno v:
Zeitschrift für angewandte Mathematik und Physik. 72
We demonstrate the existence of solutions to Signorini’s problem for the Timoshenko’s beam by using a hybrid disturbance. This disturbance enables the use of semigroup theory to show the existence and asymptotic stability. We show that stability
We study in this paper the well-posedness and stability of a linear system of a thermoelastic Cosserat medium with infinite memory, where the Cosserat medium is a continuum in which each point has the degrees of freedom of a rigid body.
Externí odkaz:
https://explore.openaire.eu/search/publication?articleId=doi_dedup___::574b3677880b133afebe1204c13ab188
Publikováno v:
Applied Mathematics & Optimization. 82:135-150
Here we consider a string composed by three different materials: thermo elastic, viscoelastic and elastic. Our main result is that the exponential stability depends on the position of each material. That is, we prove that the model is exponentially s
Publikováno v:
Journal of Mathematical Analysis and Applications. 458:1274-1291
In this paper we introduce the hybrid-penalized method, to show the global existence of at least one solution to the Signorini's problem for a Timoshenko Beam. The main advantage of this method is that we can improve all result about asymptotic behav