Symplectic classification for universal unfoldings of An singularities in integrable systems

Abstract

In the present paper, we obtain real-analytic symplectic normal forms for integrable Hamiltonian systems with n degrees of freedom near singular points having the type ``universal unfolding of An singularity'', n1 (local singularities), as well as near compact orbits containing such singular points (semi-local singularities). We also obtain a classification, up to real-analytic symplectic equivalence, of real-analytic Lagrangian foliations in saturated neighborhoods of such singular orbits (semi-global classification). These singularities (local, semi-local and semi-global ones) are structurally stable. It turns out that all integrable systems are symplectically equivalent near their singular points of this type (thus, there are no local symplectic invariants). A complete semi-local (respectively, semi-global) symplectic invariant of the singularity is given by a tuple of n-1 (respectively n-1+) real-analytic function germs in n variables, where is the number of connected components of the complement of the singular orbit in the fiber. The case n=1 corresponds to non-degenerate singularities (of elliptic and hyperbolic types) of one-degree of freedom Hamiltonians; their symplectic classifications were known. The case n=2 corresponds to parabolic points, parabolic orbits and cuspidal tori, and the case n3 -- to their higher-dimensional analogs.