Giuseppe De Donno
| Telefono | 011/6703449 | Orario di Ricevimento | su prenotazione |
| giuseppe.dedonno@unito.it | Ubicazione ufficio | Via
C. Alberto 10, II piano |
| Didattica |
| A.A.
2006-2007 A.A. 2007-2008 A.A. 2008-2009 A.A. 2009-2010 A.A. 2010-2011 |
| Ricerca |
| - Operatori
pseudo-differenziali: operatori ipoellitici. - Analisi di Fourier e sue generalizzazioni: analisi di Gabor, analisi tempo-frequenza dei segnali, operatori di Weyl, operatori di localizzazione, spazi di modulazione. |
| Pubblicazioni |
| - G. De Donno, Generalized Vandermonde Determinants for reversing Taylor's formula and application to hypoellipticity, Tamkang Journal of Mathematics 38, N0.2, (2007). - P. Boggiatto, G. De Donno, A. Oliaro, Uncertainty principle, positivity and L^p-boundedness for generalized spectrograms, accepted for pubblication on JMAA (2007) - G. De Donno, B.-W. Schulze, Meromorphic symbolic structures for boundary value problems on manifolds with edges, Math. Nachr. 279, 4, 368-399 (2006). - G. De Donno, A. Oliaro, Hypoellipticity and local solvability of anisotropic PDEs with Gevrey non-linearity, Boll. U.M.I. (8) 9-B (2006) - P. Boggiatto, G. De Donno, A. Oliaro, A class of quadratic time-frequency representations based on the short-time Fourier transform, to appear in "Modern Trends in Pseudo-Differential Operators", Proceedings 5th International ISAAC Congress, J. Toft, M.W. Wong, H. Zhu Eds., Operator Theory and Integral Equations (2005). - P. Boggiatto, G. De Donno, A. Oliaro, Weyl Operators with L^q symbols on L^p spaces, submitted to Math. Nachr. - G. De Donno, A. Oliaro, L. Rodino, Analytic and Gevrey solutions of non-linear partial differential equations, Far East J. Appl. Math. 15 (2004), no. 3, 403--425. - G. De Donno, Gevrey hypoellipticity of p-powers of non-hypoelliptic operators, Advances in pseudo-differential operators, 77--90, Oper. Theory Adv. Appl., 155, Birkhäuser, Basel, 2004. - G. De Donno, Hypoellipticity of anisotropic partial differential equations, Pliska Stud. Math. Bulgar. 15 (2003), 67-84. - G. De Donno, A. Oliaro, Local solvability and Hypoellipticity for semilinear anisotropic partial differential equations, Trans. A.M.S. 335, N.8, pp. 3405--3432 (2003). - G. De Donno, Interior regularity for semilinear partial differential equations in anisotropic Sobolev spaces, Nonlinear Analysis, 47 (2001) pp. 2829-2834. - G. De Donno, Gevrey hypoellipticity for a class of partial differential equations with high multiplicity, Proeedings workshop "Partial Differential Equations", (2000), pp. 41-51. - G. De Donno, L. Rodino, Gevrey hypoellipticity for equations with involutive characteristics of higher multiplicity, C.R.Acad.Bulg.Sci., Vol.53, N. 7, (2000), pp. 25-30. - G. De Donno, L. Rodino, Gevrey hypoellipticity for partial differential equations with characteristics of higher multiplicity, Rend. Sem. Mat. Univ. Politecnico Torino, Vol. 58, 4 (2000). G. De Donno, L. Rodino, Gevrey hypoellipticity for partial differential equations with involutive characteristics of higher multiplicity, Quad. Dip. Mat., Univ. Torino 33 (1999). G. De Donno, Gevrey hypoellipticity for a class of differential polynomials with analytic coefficients, Quad. Dip. Mat., Univ. Torino 40 (1998). |
| Organizzazione
Convegni e Seminari |
| Bimestre
Intensivo INDAM, maggio-giugno 2003, Torino |
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