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Special year in dynamical systems, Laboratoire CNRS J.-V. Poncelet
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                                '''SPECIAL YEAR OF DYNAMICAL SYSTEMS'''
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<div style='text-align:center;'>SPECIAL YEAR OF DYNAMICAL SYSTEMS</div>
  
            '''Poncelet Laboratory, Independent University of Moscow, October 1, 2011 - September 30, 2012'''
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<div style='text-align:center;'>'''Poncelet Laboratory, Independent University of Moscow</div>
  
        '''FOUNDING ORGANISATIONS: CNRS Poncelet Laboratory, Independent University of Moscow, Steklov Mathematical Institute'''
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<div style='text-align:center'>'''October 1, 2011 — September 30, 2012'''</div>
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<div style='text-align:center'>'''FOUNDING ORGANIZATIONS: CNRS Poncelet Laboratory, Independent University of Moscow, Steklov Mathematical Institute'''</div>
  
 
Many branches of dynamical systems (such as [[wikipedia:Hilbert's sixteenth problem|Hilbert's 16-th problem]], [[wikipedia:Dynamical_billiards|billiards]], ergodic theory etc.) are situated on the crossing of different domains in mathematics such as:
 
Many branches of dynamical systems (such as [[wikipedia:Hilbert's sixteenth problem|Hilbert's 16-th problem]], [[wikipedia:Dynamical_billiards|billiards]], ergodic theory etc.) are situated on the crossing of different domains in mathematics such as:

Latest revision as of 21:26, 31 July 2012

SPECIAL YEAR OF DYNAMICAL SYSTEMS
Poncelet Laboratory, Independent University of Moscow
October 1, 2011 — September 30, 2012
FOUNDING ORGANIZATIONS: CNRS Poncelet Laboratory, Independent University of Moscow, Steklov Mathematical Institute

Many branches of dynamical systems (such as Hilbert's 16-th problem, billiards, ergodic theory etc.) are situated on the crossing of different domains in mathematics such as:

  • geometry,
  • complex analysis,
  • moduli spaces,
  • Lie groups and geometric group theory,
  • spectral theory.

Results in one domain can imply important corollaries in the other ones. For example, dynamical properties of polygonal billiards are related to the Teichmüller flow and geometry of the moduli spaces. The Hilbert 16-th problem is related to holomorphic foliations, complex geometry and analysis, algebraic geometry. Modern complex dynamics is on the bridge between two domains: the classical theory of dynamical systems and complex (algebraic) geometry.

The special year of dynamical systems is intended to bring together specialists working in the above-mentioned areas, which would enrich everybody.