39 research outputs found

    Bilinear Discrete Painleve-II and its Particular Solutions

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    By analogy to the continuous Painlev\'e II equation, we present particular solutions of the discrete Painlev\'e II (d-PII\rm_{II}) equation. These solutions are of rational and special function (Airy) type. Our analysis is based on the bilinear formalism that allows us to obtain the τ\tau function for d-PII\rm_{II}. Two different forms of bilinear d-PII\rm_{II} are obtained and we show that they can be related by a simple gauge transformation.Comment: 9 pages in plain Te

    Laplacian Growth and Whitham Equations of Soliton Theory

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    The Laplacian growth (the Hele-Shaw problem) of multi-connected domains in the case of zero surface tension is proven to be equivalent to an integrable systems of Whitham equations known in soliton theory. The Whitham equations describe slowly modulated periodic solutions of integrable hierarchies of nonlinear differential equations. Through this connection the Laplacian growth is understood as a flow in the moduli space of Riemann surfaces.Comment: 33 pages, 7 figures, typos corrected, new references adde

    Universal Drinfeld-Sokolov Reduction and Matrices of Complex Size

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    We construct affinization of the algebra glλgl_{\lambda} of ``complex size'' matrices, that contains the algebras gln^\hat{gl_n} for integral values of the parameter. The Drinfeld--Sokolov Hamiltonian reduction of the algebra glλ^\hat{gl_{\lambda}} results in the quadratic Gelfand--Dickey structure on the Poisson--Lie group of all pseudodifferential operators of fractional order. This construction is extended to the simultaneous deformation of orthogonal and simplectic algebras that produces self-adjoint operators, and it has a counterpart for the Toda lattices with fractional number of particles.Comment: 29 pages, no figure

    Krein signature and Whitham modulation theory: the sign of characteristics and the “sign characteristic”

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    In classical Whitham modulation theory, the transition of the dispersionless Whitham equations from hyperbolic to elliptic is associated with a pair of nonzero purely imaginary eigenvalues coalescing and becoming a complex quartet, suggesting that a Krein signature is operational. However, there is no natural symplectic structure. Instead, we find that the operational signature is the “sign characteristic” of real eigenvalues of Hermitian matrix pencils. Its role in classical Whitham single‐phase theory is elaborated for illustration. However, the main setting where the sign characteristic becomes important is in multiphase modulation. It is shown that a necessary condition for two coalescing characteristics to become unstable (the generalization of the hyperbolic to elliptic transition) is that the characteristics have opposite sign characteristic. For example the theory is applied to multiphase modulation of the two‐phase traveling wave solutions of coupled nonlinear Schrödinger equation

    Symplectic Structures for the Cubic Schrodinger equation in the periodic and scattering case

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    We develop a unified approach for construction of symplectic forms for 1D integrable equations with the periodic and rapidly decaying initial data. As an example we consider the cubic nonlinear Schr\"{o}dinger equation.Comment: This is expanded and corrected versio

    Singular-boundary reductions of type-Q ABS equations

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    We study the fully discrete elliptic integrable model Q4 and its immediate trigonometric and rational counterparts (Q3, Q2 and Q1). Singular boundary problems for these equations are systematised in the framework of global singularity analysis. We introduce a technique to obtain solutions of such problems, in particular constructing the exact solution on a regular singularity-bounded strip. The solution technique is based on the multidimensional consistency and uses new insights into these equations related to the singularity structure in multidimensions and the identification of an associated tau-function. The obtained special solutions can be identified with open boundary problems of the associated Toda-type systems, and have interesting application to the construction of periodic solutions.Comment: 24 pages, 5 figure

    Rational Solutions of the Painleve' VI Equation

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    In this paper, we classify all values of the parameters α\alpha, β\beta, γ\gamma and δ\delta of the Painlev\'e VI equation such that there are rational solutions. We give a formula for them up to the birational canonical transformations and the symmetries of the Painlev\'e VI equation.Comment: 13 pages, 1 Postscript figure Typos fixe
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