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Seminario Matematico e Fisico di Milano
Piazza Leonardo da Vinci, 32 - 20133 Milano
Head of Seminar: Paolo Stellari
      
Deputy Head: Gabriele Grillo
      
Secretary: Giona Veronelli

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JOHN G. THOMPSON, University of Cambridge
SL(2,Z) AND DIRICHLET SERIES
Tuesday, October 26 2010, at 16:30
Università di Milano, Dipartimento di Matematica, Via Saldini
 
ALBERTO FARINA, Université de Picardie
TRANSIZIONI DI FASE, STABILITA E SIMMETRIA
http://www.mathinfo.u-picardie.fr/farina/
Monday, October 25 2010, at 17:00
Dipartimento di Matematica, Politecnico di Milano, Aula Seminari MOX VI piano
Abstract
 
SUN-YUNG ALICE CHANG, Princeton University
Q-CURVATURE: ANALYTIC AND GEOMETRIC ASPECTS
Monday, October 04 2010, at 16:30
Università di Milano, Dipartimento di Matematica, Via Saldini
 
PAVEL KREJCI, Institute of Mathematics, Academy of Sciences of the Czech Republic
REMARKS ON $L^1$ REGULARITY OF GRADIENT FLOWS
Monday, September 27 2010, at 17:00
Dipartimento di Matematica, Università di Milano, Via Saldini
Abstract
 
ALEXANDER KUZNETSOV, Steklov Mathematical Institute, Moscow
DERIVED CATEGORIES AND BIRATIONAL INVARIANTS
Monday, September 13 2010, at 17:00
Università di Milano, Dipartimento di Matematica, Via Saldini, Sala di Rappresentanza
Abstract
 
MICHAEL SHAPIRO, Instituto Politecnico Nacional (Mexico City)
HYPERCOMPLEX ANALYSIS AS A UNIFYING THEORY: ON SOME BASIC IDEAS.
Monday, September 06 2010, at 17:00
Sala del Consiglio, 7o piano, Dipartimento di Matematica, Politecnico di Milano.
Abstract
Hypercomplex analysis is a generic name for those generalizations of one-dimensional complex analysis which involve hypercomplex numbers. Quaternionic analysis is the oldest and the most known version of it, so that it will be discussed, first of all, in which sense it is a "proper" or a "closest" version in low dimensions which includes, as particular cases, such classic theories as vector analysis and holomorphic mappings in two complex variables, as well as some systems of partial differential equations. This allows to one, by developing quaternionic analysis, to obtain new results for the above classic theories and to refine known ones; some applications of this approach will be presented. Some comments on Clifford analysis and its applications will be also made.