The Hamiltonian structure of the second Painlevé hierarchy

Mazzocco, Marta; Mo, M. Y.

doi:10.1088/0951-7715/20/12/006

Cited by 35 publications

(43 citation statements)

References 46 publications

(122 reference statements)

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“…This Lax system was found by Flaschka and Newell in [22] for the Painlevé II equation, and generalized to the Painlevé II hierarchy in [13,34,38].…”

Section: Lax System For the Painlevé II Hierarchymentioning

confidence: 83%

Higher‐order analogues of the Tracy‐Widom distribution and the Painlevé II hierarchy

Claeys

Its

Krasovsky

2009

Comm Pure Appl Math

132

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We study Fredholm determinants related to a family of kernels which describe the edge eigenvalue behavior in unitary random matrix models with critical edge points. The kernels are natural higher order analogues of the Airy kernel and are built out of functions associated with the Painlevé I hierarchy. The Fredholm determinants related to those kernels are higher order generalizations of the TracyWidom distribution. We give an explicit expression for the determinants in terms of a distinguished smooth solution to the Painlevé II hierarchy. In addition we compute large gap asymptotics for the Fredholm determinants.

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“…This Lax system was found by Flaschka and Newell in [22] for the Painlevé II equation, and generalized to the Painlevé II hierarchy in [13,34,38].…”

Section: Lax System For the Painlevé II Hierarchymentioning

confidence: 83%

Higher‐order analogues of the Tracy‐Widom distribution and the Painlevé II hierarchy

Claeys

Its

Krasovsky

2009

Comm Pure Appl Math

132

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“…A similar idea, however, can be found in the recent work of Mazzocco and Mo [41] on an isomonodromic hierarchy related to the second Painlevé equation. They start from the LiePoisson structure of a loop algebra, and convert the Hamiltonian structure on a coadjoint orbit to a Hamiltonian system in Darboux coordinates by a time-dependent canonical transformation.…”

Section: Resultsmentioning

confidence: 54%

Hamiltonian Structure of PI Hierarchy

Takasaki¹

2007

SIGMA

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Abstract. The string equation of type (2, 2g + 1) may be thought of as a higher order analogue of the first Painlevé equation that corresponds to the case of g = 1. For g > 1, this equation is accompanied with a finite set of commuting isomonodromic deformations, and they altogether form a hierarchy called the PI hierarchy. This hierarchy gives an isomonodromic analogue of the well known Mumford system. The Hamiltonian structure of the Lax equations can be formulated by the same Poisson structure as the Mumford system. A set of Darboux coordinates, which have been used for the Mumford system, can be introduced in this hierarchy as well. The equations of motion in these Darboux coordinates turn out to take a Hamiltonian form, but the Hamiltonians are different from the Hamiltonians of the Lax equations (except for the lowest one that corresponds to the string equation itself).

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“…Interestingly, that solutions of the Nth equation in the generalized second Painlevé hierarchy with N > 1 also satisfy the equations (2m + 1)∂ t m w + ∂ z (∂ z + 2w)L m ∂ z w − w 2 = 0, 1 m N − 1, (5.1) which belong to a rescaled version of the mKdV hierarchy [1]. This, in particular, means that rational solutions of the mKdV (and, consequently, KdV) equation are directly expressible as logarithmic derivatives of the generalized Yablonskii-Vorob'ev polynomials.…”

Section: Resultsmentioning

confidence: 99%

“…The hierarchy appears as similarity reduction of the modified Korteweg-de Vries (mKdV) hierarchy and possesses several mathematical and physical applications [1,2]. The aim of this Letter is to derive special polynomials V (N) n (z; t 1 , .…”

Section: Introductionmentioning

confidence: 99%