Consecutive Rosochatius Deformations of the Garnier System and the Hénon-Heiles System

and Applied Analysis 3 take the Garnier system and the Hénon-Heiles system as examples to show that the Rosochatius deformations and second Rosochatius deformations of integrable systems can be generated from the realizations of (7) and (8), respectively, according to the above recipe. Thus, applying Proposition 1 in turn enables us to consecutively construct Rosochatius deformations of the integrable Hamiltonian systems. 3. Consecutive Rosochatius Deformations of the Garnier System We take L 0 (λ) in (1) as


Introduction
Usually the integrability of a Hamiltonian system is destroyed even with a very small perturbation.As early as in 1877, Rosochatius first discovered that it would keep the integrability to add a potential of the sum of inverse squares of the coordinates to that of the Neumann system [1,2].This provides an interesting example of integrable perturbation.Nowadays, the resulting system is called the Neumann-Rosochatius system [3][4][5][6][7].In 1985, Wojciechowski gained an analogy system (called Garnier-Rosochatius system) for the Garnier system [8,9].Later in 1999, based on the Deift technique and a well-known theorem that the Gauss map transforms the Neumann system to the Jacobi system, Kubo et al. constructed the analogy system for the Jacobi system or the geodesic flow equation on the ellipsoid [10][11][12].In 2007, one of the authors (Zhou) generalized the Rosochatius deformations of the constrained soliton flows [13], and then the method has been extended to construct the integrable deformations of the symplectic maps [14] and the soliton equations with self-consistent sources [15].
There appear some important physical and mathematical applications of Rosochatius deformed integrable systems.For example, the Neumann-Rosochatius system can be used to describe the dynamics of a rotating closed string and the membranes [16,17], the Garnier-Rosochatius system can be used to solve the multicomponent coupled nonlinear Schödinger equation [18,19], and the Rosochatius deformation of the KdV equation with self-consistent sources can be used to establish the bi-Hamiltonian structure of the KdV6 equation [20].
Recently, we proposed an approach to generate integrable Rosochatius deformations of the Neumann system consecutively [21].The Lax matrix of the -copies of Neumann system is of the form of classical sl(2) Gaudin magnet defined on the 2( − 1)-dimensional submanifold.In this paper, we would like to show that the approach can be applied to the integrable Hamiltonian systems whose Lax matrices are of the form of the generalized Gaudin magnet.We first present an algorithm of constructing infinitely many realizations of generalized sl(2) Gaudin magnet model.Then, we describe how to generate integrable Hamiltonian systems based on the realizations of sl(2) Gaudin magnet.The Rosochatius deformation of an integrable Hamiltonian system is explained as a special case of the realizations of generalized sl(2) Gaudin magnet model.Thus, such an algorithm enables us to construct Rosochatius deformations of the integrable Hamiltonian systems consecutively.As applications, we obtain the consecutive Rosochatius deformations of the Garnier system and the Hénon-Heiles system as well as their Lax representations.
The plan of the paper is as follows.In Section 2, we propose infinitely many symplectic realizations of sl(2) Gaudin magnet and describe how to generate the integrable Hamiltonian systems based on these realizations.In Sections 3 and 4, we pay attention to studying the integrable deformations
This proposition provides us with two kinds of new realizations of sl(2) algebra (2) from a known one.Moreover, applying such two kinds of realizations in turn, we can construct an infinitely many realizations of sl(2) algebra (2).For example, from (4), we obtain the following realizations of (2):

A Recipe for Generating Integrable Hamiltonian Systems
Based on Realizations of sl( 2) Gaudin Magnet.Now, we describe how to generate an integrable Hamiltonian system based on a symplectic realization of sl(2) Gaudin magnet.We suppose that the Lax matrix ( 1) satisfies an -matrix relation [24] { where is an arbitrary parameter, and [⋅, ⋅] denotes the commutator of the matrices, such as According to the general theory of the -matrix [24,25], we have First, we expand det () as From ( 10), we have which implies that   's are in involution in pairs.Usually, we can single out  functionally independent   1 , . . .,    among {  } ≥ 0 .Choosing a Hamiltonian , which is composed of some of   's, we have Functionally independent and involutive pairwise integrals,   1 , . . .,    , ensure that the Hamiltonian system  is completely integrable in the sense of Liouville [26].Further, substituting a realization of (2) into the Lax matrix (1) and the corresponding   's and  defined above, we finally obtain an integrable Hamiltonian system with the Hamiltonian  expressed in canonical coordinates (  ,   ): The above recipe shows that, once having a symplectic realization of sl(2) algebra (2), we may obtain an integrable Hamiltonian system.In the next sections, we will take the Garnier system and the Hénon-Heiles system as examples to show that the Rosochatius deformations and second Rosochatius deformations of integrable systems can be generated from the realizations of ( 7) and ( 8), respectively, according to the above recipe.Thus, applying Proposition 1 in turn enables us to consecutively construct Rosochatius deformations of the integrable Hamiltonian systems.

Consecutive Rosochatius Deformations of the Garnier System
We take  0 () in (1) as then, the Lax matrix (1) becomes Direct calculations yield that which is equivalent to the -matrix algebra.
Example 4 (The Second Rosochatius Deformation of the Garnier System).Based on the realization of (8), we obtain the Lax matrix and the integrals of motion Choosing a Hamiltonian Ĥ = − F0 , we obtain an integrable Hamiltonian system which is the second Rosochatius deformation of the Garnier system.With direct calculations, we find that (35) admits the Lax representation: where There is no doubt that we can consecutively construct Rosochatius deformations of the Garnier system by applying the two kinds of realizations in Proposition 1 in turn and the recipe we described in Section 2.2.Here, we only present the above two examples.

Consecutive Rosochatius Deformations of the Hénon-Heiles System
Now, we begin with the Lax matrix of the form Defining a generating function we have We may check directly that (38) satisfies the same -matrix relation as (18).Thus, we have the involutive relation: Now, we discuss the integrable Hamiltonian system generated by the Lax matrix (38) and its realizations.Firstly, with the realization of (4), we arrive at the following Lax matrix: and (40) becomes The Hamiltonian system with Hamiltonian  = −(1/8) 0 reads which is just the Hénon-Heiles system [30][31][32], and it allows the Lax representation: where () is given by (42), and Example 5 (The Rosochatius Deformation of the Hénon-Heiles System).Under realization of (7), we arrive at the Lax matrix and (40) becomes Taking the Hamiltonian as H = −(1/8) P0 , we have which is exactly the Rosochatius deformation of Hénon-Heiles system [12,15].It can be checked directly that (49) allows the Lax representation: where L() is given by (47) and () is given by (46).
Example 6 (The Second Rosochatius Deformation of the Hénon-Heiles System).Based on the realization of (8), we obtain the Lax matrix The integrals of motion P0 , F0 , and F ,  ≥ 1, can be generated from det L().In particular, we have where L() is given by (51) and () is given by (46).

Concluding Remarks
We have shown how to consecutively generate integrable Rosochatius deformations of the integrable Hamiltonian systems whose Lax matrices are of the form of the generalized Gaudin magnet.As applications, we obtained the consecutive Rosochatius deformations of the Garnier system and the Hénon-Heiles system together with their Lax representations.
Our method is performed in a unified way.There is no doubt that our method can be applied to other constrained soliton flows [28,32] whose Lax matrices are of the form of the generalized Gaudin magnet or the generalized Gaudin magnet with boundary.Also, we remark that our method can be used to construct consecutive Rosochatius deformations of the integrable symplectic maps and the soliton equations with self-consistent sources.