Integrability conditions for two-dimensional Toda-like equations

Habibullin, I. T.; Кузнецова, М. Н.; Sakieva, Alfia

doi:10.1088/1751-8121/abac98

Cited by 11 publications

(12 citation statements)

References 40 publications

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“…The essence of the method is that we put forward the following hypothesis: the condition for the existence of such a reduction of an arbitrarily high order is an integrability test for lattices in 3D. The correctness of this hypothesis was confirmed in the works [2][3][4][5], where the problem of classification of differential-difference equations of the two-dimensional Toda lattice type…”

Section: Introductionmentioning

confidence: 93%

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An algebraic criterion of the Darboux integrability of differential-difference equations and systems

Habibullin,

Kuznetsova

2021

Preprint

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The article investigates Darboux-integrable systems of differential-difference equations of hyperbolic type. The concept of a complete set of essentially independent characteristic integrals underlying Darboux integrability is discussed. A close connection is found between integrals and characteristic Lie-Rinehart algebras of the system. It is proved that a system of equations is Darboux integrable if and only if its characteristic algebras in both directions are finitedimensional.

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Section: Introductionmentioning

confidence: 93%

“…The next step in this direction is to study the problem of adaptation of the classification algorithm worked out in [2][3][4][5] to a class of semi-discrete equations of the form u j n+1,x = F (u j n,x , u j+1 n , u j n+1 , u j n , u j−1 n+1 ),…”

Section: Introductionmentioning

confidence: 99%

An algebraic criterion of the Darboux integrability of differential-difference equations and systems

Habibullin,

Kuznetsova

2021

Preprint

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“…In particular, in [2], integrable exponential type systems with Cartan matrices of size 2 were studied, and in [3], systems corresponding to non-degenerate Cartan matrices and, in particular, systems corresponding to Lie algebras of the series , were integrated explicitly. We also mention papers [4]- [6] by the Ufa school , in which reductions of exponential type systems and their connection with higher symmetries were studied, and a series of papers [7]- [17], in which discrete analogs of exponential type systems were studied.…”

Section: Introductionmentioning

confidence: 99%

Characteristic algebras and integrable exponential systems

Миллионщиков

Смирнов

2021

Ufimsk. Mat. Zh.

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In the present paper we study characteristic algebras for exponential systems corresponding to degenerate Cartan matrices. These systems generalize hyperbolic sine-Gordon and Tzitzeica equations well-known in the theory of integrable systems. For such systems, corresponding to Cartan matrices of rank 2, we describe explicitly characteristic algebras in terms of generators and relations and we prove that they have linear growth. We study the relations between the higher symmetries of these systems and the structure of their characteristic algebras. We describe completely the higher symmetries of exponential systems corresponding to the Cartan matrix of affine Lie algebra(1) 2 . We also obtain partial results on symmetries of such systems corresponding to other degenerate Cartan matrices of rank 2. We propose a conjecture on the structure of higher symmetries of arbitrary exponential system corresponding to a degenerate Cartan matrix. We study an interesting combinatorics related to an operator generating a characteristic algebra in the simplest case for a Darboux integrable Liouville equation. The found combinatorial properties can be very useful for proving the aforementioned conjecture on the structure of higher symmetries. Moreover, in the present paper we give a rigorous meaning to the concept of a characteristic algebra of a hyperbolic system used for a long time in the literature. We do this by means of the notion of Lie-Rinehart algebra and at the examples we demonstrate that such formalization is indeed needed.

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“…In a number of recent publications [8,13,14,15,16,18] the problem of integrable classification of two-dimensional lattices u n,xy = f (u n+1 , u n , u n−1 , u n,x , u n,y ), −∞ < n < ∞, (1.1) was studied. Here the sought function u n = u n (x, y) depends on the real variables x, y and the integer variable n. In these papers we proposed the method for seeking and classifying integrable equations with three independent variables based on the requirement of the existence of a set of Darboux integrable reductions and on the notion of the characteristic Lie-Rinehart algebras.…”

Section: Introductionmentioning

confidence: 99%

Lax Pair for a Novel Two-Dimensional Lattice

Кузнецова¹

2021

SIGMA

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In paper by I.T. Habibullin and our joint paper the algorithm for classification of integrable equations with three independent variables was proposed. This method is based on the requirement of the existence of an infinite set of Darboux integrable reductions and on the notion of the characteristic Lie-Rinehart algebras. The method was applied for the classification of integrable cases of different subclasses of equations u n,xy = f (u n+1 , u n , u n−1 , u n,x , u n,y ) of special forms. Under this approach the novel integrable chain was obtained. In present paper we construct Lax pair for the novel chain. To construct the Lax pair, we use the scheme suggested in papers by E.V. Ferapontov. We also study the periodic reduction of the chain.

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Integrability conditions for two-dimensional Toda-like equations

Cited by 11 publications

References 40 publications

An algebraic criterion of the Darboux integrability of differential-difference equations and systems

An algebraic criterion of the Darboux integrability of differential-difference equations and systems

Characteristic algebras and integrable exponential systems

Lax Pair for a Novel Two-Dimensional Lattice

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