Academic literature on the topic 'Semi-Groupes d'évolution'
Create a spot-on reference in APA, MLA, Chicago, Harvard, and other styles
Consult the lists of relevant articles, books, theses, conference reports, and other scholarly sources on the topic 'Semi-Groupes d'évolution.'
Next to every source in the list of references, there is an 'Add to bibliography' button. Press on it, and we will generate automatically the bibliographic reference to the chosen work in the citation style you need: APA, MLA, Harvard, Chicago, Vancouver, etc.
You can also download the full text of the academic publication as pdf and read online its abstract whenever available in the metadata.
Journal articles on the topic "Semi-Groupes d'évolution":
Lamberton, Damien. "Equations d'évolution linéaires associées à des semi-groupes de contractions dans les espaces Lp." Journal of Functional Analysis 72, no. 2 (June 1987): 252–62. http://dx.doi.org/10.1016/0022-1236(87)90088-7.
Dissertations / Theses on the topic "Semi-Groupes d'évolution":
Zaafrani, Ibtissem. "Dynamique et stabilisation d’un plasma magnétique froid." Electronic Thesis or Diss., Université de Lorraine, 2021. http://www.theses.fr/2021LORR0312.
In this thesis, we consider a linearized Euler-Maxwell model for the propagation and absorption of electromagnetic waves in a magnetized plasma. Two types of boundary conditions are considered: perfectly conducting on the whole boundary and Silver-Müller, homogeneous or not, on part of it. First, I establish the equations of the model and show its well-posedness by the theory of semigroups. Then, I am interested in the stabilization of the model. First, I carry out a study on the long- term asymptotic behavior of the solution. I show that it decreases towards zero under certain physically reasonable assumptions. I conclude that it converges to a non-zero stationary state in a larger energy space. This stationary state is linked to the topology properties of the domain, and is expressed as a function of the initial data. Secondly, I study the energy decay rate by using the frequency domain method. I establish a polynomial decay for both boundary conditions. I also prove a conditional exponential decay result in the homogeneous Silver-Müller case. In the perfectly conducting case, we show that the Euler-Maxwell system is not exponentially stable. We conclude by a result of convergence towards the time-harmonic regime in the presence of a harmonic forcing. Among the main difficulties encountered, the resolvent of the evolution operator is not compact and the internal absorption acts only on the fluid variables. No homogeneity assumption is made, and the topological and geometrical assumptions on the domain are minimal. These results appear strongly linked to the spectral properties of various matrices describing the anisotropy and other plasma properties. Finally, we extend those results to the case of a vacuum-plasma interface problem
Lassoued, Dhaou. "Fonctions presque-périodiques et Équations Différentielles." Phd thesis, Université Panthéon-Sorbonne - Paris I, 2013. http://tel.archives-ouvertes.fr/tel-00942969.
Books on the topic "Semi-Groupes d'évolution":
Pavel, N. H. Nonlinear evolution operators and semigroups: Applications to partial differential equations. Berlin: Springer-Verlag, 1987.
Hahn, T., S. Brendle, M. Campiti, Klaus-Jochen Engel, and Rainer Nagel. One-Parameter Semigroups for Linear Evolution Equations. Springer New York, 2013.
Hahn, T., S. Brendle, M. Campiti, Klaus-Jochen Engel, and Rainer Nagel. One-Parameter Semigroups for Linear Evolution Equations. Springer London, Limited, 2006.
Engel, Klaus-Jochen, and Rainer Nagel. One-Parameter Semigroups for Linear Evolution Equations (Graduate Texts in Mathematics). Springer, 1999.