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VITTORIA PIERFELICE | ||
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Maître
de Conférences |
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Université
d'Orléans Batîment de Mathématiques BP 6759 45067 Orléans Cedex 2 France |
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Bureau : 21 ; Tél : +33 (0)2.38.49.47.55 ; | |
Mél : Vittoria.Pierfelice@univ-orleans.fr | ||
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Thèmes
de recherche:
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Publications: Preprints: • V. Pierfelice, The incompressible Navier-Stokes equation on non-compact manifolds.
• P. D’Ancona, P. Maheux et V. Pierfelice, Log-Sobolev inequalities for semi-direct product operators.• V. Pierfelice, Dispersive estimates on product manifolds. Revues à comité de lecture: • J.-P. Anker et V. Pierfelice, Wave and Klein-Gordon equations on hyperbolic spaces, à paraître dans Analysis & PDE, (2014). • J.-P. Anker, V. Pierfelice et M. Vallarino, Wave equation on Damek-Ricci spaces, à paraître dans Annali di Matematica Pura e Applicata, (2013). • J.-P. Anker, V. Pierfelice et M. Vallarino, Wave equation on real hyperbolic spaces, Journal of Differential Equations, 252, 10, (2012), 5613-5661. • J.-P. Anker, V. Pierfelice et M. Vallarino, Schroedinger equation on Damek-Ricci spaces, Communications in Partial Differential Equations, 36, 6, (2011), 976-997. • P. D'Ancona, V. Pierfelice et Fulvio Ricci, On the Wave equation associated to the Hermite and Twisted Laplacian, Journal of Fourier Analysis and Applications, 16, 2, (2010), 294-310. • P. Gérard et V. Pierfelice, Nonlinear Schroedinger equation on four-dimensional compact manifolds, Bulletin de la Société Mathématique de France, 138, 1, (2010), 119-151. • J.-P. Anker et V. Pierfelice, The nonlinear Schroedinger equation on real hyperbolic spaces, Annales de l’Institut Henri Poincaré-Analyse Non Linéaire, 26, (2009), 1853-1869. • V. Pierfelice, Weighted Strichartz estimates for the Schroedinger and wave equations on Damek-Ricci spaces, Mathematishe Zeitschrift, 260, 2 (2008), 377-392. • V. Pierfelice, Decay estimates for the wave equation with a small potential, NoDEA, Nonlinear Differential Equations and Applications, 13, 5-6 (2007), 511-530. • V. Pierfelice, Weighted Strichartz estimates for the radial Schroedinger equation on the hyperbolic space, Manuscripta Mathematica, 120, 4 (2006), 377-389. • V. Pierfelice, Strichartz estimates for the Schroedinger and heat equations perturbed with singular and time dependent potentials, Asymptotic Analysis, 47, 1-2 (2006), 1-18. • P. D'Ancona, V. Pierfelice et A. Teta, Dispersive estimates for the Schroedinger equation with point interaction, Mathematical Methods in the Applied Sciences, 29, 3 (2006), 309-323. • P. D'Ancona, V. Pierfelice et N. Visciglia, Some remarks on the Schroedinger equation with a potential in $L^r_t L^s_x$, Mathematishe Annalen, 333, 2 (2005) 271-290. • P. D'Ancona, V. Pierfelice, On the wave equation with a large rough potential, Journal of functional Analysis, 227, 1 (2005), 30-77. Actes de Conférences : • V. Pierfelice, Kelvin Transform and weighted Strichartz estimates, Applications of Mathematics in engineering and economics, 114-119, Bulvest 2000, 2004. • P. D'Ancona, V. Pierfelice, Dispersive estimates for the wave equation with a rough potential, Colloque Franco-Tunisien d'EDP " (Hammamet, Tunisie, 16-21 Septembre 2003). Thèse de Doctorat : Thèse de Mathématiques soutenue à l'Université de Pisa, sous la direction de Vladimir Georgiev, intitulée Dispersive equations on manifolds. Curriculum vitae: CV |
Projets de recherche : • Membre du Projet Blan ANR HAB, “Harmonic Analisi at its Boundaries” 2012-2016 (coordinateur : Pascal Auscher, Prof. Université de Paris Sud-Orsay), http://hab.math.cnrs.fr. • Responsable du Projet de recherche franco-italien n.25970QB VAMP - PHC GALILEE 2011-2012 entre l’Université d’Orléans, l’Université de Milano Bicocca et Politecnico di Torino. |
Dernière mise à jour
: 2014 |