ORARIO DI RICEVIMENTO
Lunedì, ore 10:30 - 11:30, Ca' Vignal 2, piano 2, stanza 18
Monday, 10:30-11:30 am, Ca' Vignal 2, floor 2, room 18
Inviare e-mail con qualche giorno di anticipo per fissare un appuntamento.
Send an e-mail a few day in advance to take an appointment.
I am associate professor in the Mathematical Physics, with interests in
Modules running in the period selected: 50.
Click on the module to see the timetable and course details.
Di seguito sono elencati gli eventi e gli insegnamenti di Terza Missione collegati al docente:
Topic | Description | Research area |
---|---|---|
Quantum fluids, vortex dynamics, sound and Kelvin waves | In collaboration with Renzo Ricca of the University of Milano-Bicocca we investigate using computational and geometrical techniques the formation and evolution of so-called sound and Kelvin waves that occur when two or more vortex filaments reconnect. |
Algebra, Geometry, and Mathematical Logic
Methods of Riemannian geometry, including PDE methods; curvature restrictions |
Nonholonomic dynamcis | Nonholonomic systems are mechanical systems with constraints in the velocities. Incollaboration with the research group in Padova, we investigate the geometry and form of the equations of motions, investigate their integrability and symmetric properites and apply our results to concrete examples. We also apply our knoledge and methods to geometric control of mechanical systems. |
Mathematical methods and models
Finite-dimensional Hamiltonian, Lagrangian, contact, and nonholonomic systems |
Geometric quantization | In collaboration with Mauro Spera of the Catholic University of Brescia we investigate the Geometric Quantization of Non-Commutative integrable finite dimensional Hamiltonian systems. |
Algebra, Geometry, and Mathematical Logic
Methods of Riemannian geometry, including PDE methods; curvature restrictions |
Finite dimensional Hamiltonian and non-Hamiltonian integrable systems | We focus on semiglobal and global aspect regarding the geometry and dynamics of integrable finite dimensional Hamiltonian and non-Hamiltonian systems, and recently of small perturbations of non-Hamiltonian systems. General integrability results about non-Hamiltonian finite dimensional systems are investigated, in particular on almost symplectic and Poisson manifolds and on Dirac manifolds. |
Mathematical methods and models
Finite-dimensional Hamiltonian, Lagrangian, contact, and nonholonomic systems |
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