Viktor Ayadi

Publications (4) View all

• Article: Superintegrability of rational Ruijsenaars-Schneider systems and their action-angle duals

  V. Ayadi, L. Feher, T. F. Gorbe
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  ABSTRACT: We explain that the action-angle duality between the rational Ruijsenaars-Schneider and hyperbolic Sutherland systems implies immediately the maximal superintegrability of these many-body systems. We also present a new direct proof of the Darboux form of the reduced symplectic structure that arises in the `Ruijsenaars gauge' of the symplectic reduction underlying this case of action-angle duality. The same arguments apply to the BC(n) generalization of the pertinent dual pair, which was recently studied by Pusztai developing a method utilized in our direct calculation of the reduced symplectic structure.
  09/2012;
• Source

  Available from: ArXiv

  Article: An integrable BC(n) Sutherland model with two types of particles

  V. Ayadi, L. Feher
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  ABSTRACT: A hyperbolic BC(n) Sutherland model involving three independent coupling constants that characterize the interactions of two types of particles moving on the half-line is derived by Hamiltonian reduction of the free geodesic motion on the group SU(n,n). The symmetry group underlying the reduction is provided by the direct product of the fixed point subgroups of two commuting involutions of SU(n,n). The derivation implies the integrability of the model and yields a simple algorithm for constructing its solutions.
  05/2011;
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  Available from: Viktor Ayadi

  Article: Trigonometric Sutherland systems and their Ruijsenaars duals from symplectic reduction

  L. Feher, V. Ayadi
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  ABSTRACT: Besides its usual interpretation as a system of $n$ indistinguishable particles moving on the circle, the trigonometric Sutherland system can be viewed alternatively as a system of distinguishable particles on the circle or on the line, and these 3 physically distinct systems are in duality with corresponding variants of the rational Ruijsenaars-Schneider system. We explain that the 3 duality relations, first obtained by Ruijsenaars in 1995, arise naturally from the Kazhdan-Kostant-Sternberg symplectic reductions of the cotangent bundles of the group U(n) and its covering groups $U(1) \times SU(n)$ and ${\mathbb R}\times SU(n)$, respectively. This geometric interpretation enhances our understanding of the duality relations and simplifies Ruijsenaars' original direct arguments that led to their discovery.
  05/2010;
• Source

  Available from: ArXiv

  Article: On the superintegrability of the rational Ruijsenaars–Schneider model

  V. Ayadi, L. Fehér
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  ABSTRACT: The rational and hyperbolic Ruijsenaars–Schneider models and their non-relativistic limits are maximally superintegrable since they admit action variables with globally well-defined canonical conjugates. In the case of the rational Ruijsenaars–Schneider model we present an alternative proof of the superintegrability by explicitly exhibiting extra conserved quantities relying on a generalization of the construction of Wojciechowski for the rational Calogero model.
  Physics Letters A. 09/2009;