Objectif "Nonlinear field theories, which possess soliton solutions as part of their energy spectrum, are of great interest in mathematical physics. A soliton is a finite-energy solution of a nonlinear partial differential equation, which is stabilized by a conserved charge associated with the field theory. The analysis of solitons necessitates a large expanse of mathematical techniques, often merging analytical and geometrical techniques with sophisticated numerical ones. Advancements in computing power have meant many more soliton solutions can be obtained numerically. This has made much more intricate and computationally intensive soliton simulations possible, making solitons a very interesting modern topic. The theory of solitons is particularly appealing since not only are interesting mathematical structures but also appear in cosmology, nuclear and high energy physics, condensed matter and even in nano-technology. Moreover, in the effort of creating soliton solutions significant advancements have been made in numerical analysis, symbolic computer algebra and differential geometry.The ambitious aim of this project is to provide a link between fundamental theory, particle physics and cosmology through a novel mathematical description, using geometrical formulation, in which particles arise as stable localized excitations corresponding to topological solitons." Champ scientifique natural sciencesphysical sciencestheoretical physicsparticle physicsnatural sciencesmathematicsapplied mathematicsmathematical physicsnatural sciencesmathematicspure mathematicsmathematical analysisdifferential equationspartial differential equationsnatural sciencesphysical sciencesastronomyphysical cosmologynatural sciencesmathematicsapplied mathematicsnumerical analysis Programme(s) FP7-PEOPLE - Specific programme "People" implementing the Seventh Framework Programme of the European Community for research, technological development and demonstration activities (2007 to 2013) Thème(s) FP7-PEOPLE-2013-IRSES - Marie Curie Action "International Research Staff Exchange Scheme" Appel à propositions FP7-PEOPLE-2013-IRSES Voir d’autres projets de cet appel Régime de financement MC-IRSES - International research staff exchange scheme (IRSES) Coordinateur ARISTOTELIO PANEPISTIMIO THESSALONIKIS Contribution de l’UE € 149 100,00 Adresse KEDEA BUILDING, TRITIS SEPTEMVRIOU, ARISTOTLE UNIVERSITY CAMPUS 546 36 THESSALONIKI Grèce Voir sur la carte Région Βόρεια Ελλάδα Κεντρική Μακεδονία Θεσσαλονίκη Type d’activité Higher or Secondary Education Establishments Contact administratif Georgia Petridou (Ms.) Liens Contacter l’organisation Opens in new window Site web Opens in new window Coût total Aucune donnée Participants (1) Trier par ordre alphabétique Trier par contribution de l’UE Tout développer Tout réduire CARL VON OSSIETZKY UNIVERSITAET OLDENBURG Allemagne Contribution de l’UE € 75 600,00 Adresse AMMERLAENDER HEERSTRASSE 114-118 26129 Oldenburg Voir sur la carte Région Niedersachsen Weser-Ems Oldenburg (Oldenburg), Kreisfreie Stadt Type d’activité Higher or Secondary Education Establishments Contact administratif Sabine Geruschke (Mrs.) Liens Contacter l’organisation Opens in new window Site web Opens in new window Coût total Aucune donnée