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The quantum torus algebra plays an important role in a special class of solutions of the Toda hierarchy. Typical examples are the solutions related to the melting crystal model of topological strings and 5D SUSY gauge theories. The quantum…

Mathematical Physics · Physics 2011-03-14 Kanehisa Takasaki

We consider the reduced quasi-classical self-dual Yang-Mills equation (rYME) and two recently found (Jahnov\'{a} and Voj\v{c}\'{a}k, 2024) invertible recursion operators $\mathcal{R}^q$ and $\mathcal{R}^m$ for its full-fledged (in a given…

Exactly Solvable and Integrable Systems · Physics 2024-07-02 Jirina Jahnova , Petr Vojcak

First order Hamiltonian operators of differential-geometric type were introduced by Dubrovin and Novikov in 1983, and thoroughly investigated by Mokhov. In 2D, they are generated by a pair of compatible flat metrics $g$ and $\tilde g$ which…

Differential Geometry · Mathematics 2015-06-18 E. V. Ferapontov , P. Lorenzoni , A. Savoldi

We introduce and investigate a family of tau-functions of the 2D Toda hierarchy, which is a natural generalization of the hypergeometric family associated with Hurwitz numbers. For this family we prove a skew Schur function expansion…

Mathematical Physics · Physics 2025-11-06 Alexander Alexandrov

This paper is mainly a review of the multi--Hamiltonian nature of Toda and generalized Toda lattices corresponding to the classical simple Lie groups but it includes also some new results. The areas investigated include master symmetries,…

Exactly Solvable and Integrable Systems · Physics 2009-11-11 Pantelis A. Damianou

We construct a certain reduction of the 2D Toda hierarchy and obtain a tau-symmetric Hamiltonian integrable hierarchy. This reduced integrable hierarchy controls the linear Hodge integrals in the way that one part of its flows yields the…

Exactly Solvable and Integrable Systems · Physics 2022-05-19 Si-Qi Liu , Zhe Wang , Youjin Zhang

In this paper we generalize the quantization procedure of Toda-mKdV hierarchies to the case of arbitrary affine (super)algebras. The quantum analogue of the monodromy matrix, related to the universal R-matrix with the lower Borel subalgebra…

High Energy Physics - Theory · Physics 2009-11-11 Petr P. Kulish , Anton M. Zeitlin

We use the combinatorics of toric networks and the double affine geometric $R$-matrix to define a three-parameter family of generalizations of the discrete Toda lattice. We construct the integrals of motion and a spectral map for this…

Algebraic Geometry · Mathematics 2016-09-21 Rei Inoue , Thomas Lam , Pavlo Pylyavskyy

A systematic construction of super W-algebras in terms of the WZNW model based on a super Lie algebra is presented. These are shown to be the symmetry structure of the super Toda models, which can be obtained from the WZNW theory by…

High Energy Physics - Theory · Physics 2015-06-26 L. A. Ferreira , J. F. Gomes , R. M. Ricotta , A. H. Zimerman

The symmetries of the simplest non-abelian Toda equations are discussed. The set of characteristic integrals whose Hamiltonian counterparts form a W-algebra, is presented.

High Energy Physics - Theory · Physics 2007-05-23 Khazret S. Nirov , Alexander V. Razumov

Moving frames of various kinds are used to derive bi-Hamiltonian operators and associated hierarchies of multi-component soliton equations from group-invariant flows of non-stretching curves in constant curvature manifolds and Lie group…

Exactly Solvable and Integrable Systems · Physics 2009-11-11 Stephen C. Anco

We revisit the symmetry structure of integrable PDEs, looking at the specific example of the KdV equation. We identify 4 nonlocal symmetries of KdV depending on a parameter, which we call generating symmetries. We explain that since these…

Exactly Solvable and Integrable Systems · Physics 2023-11-30 Alexander G. Rasin , Jeremy Schiff

Combining an old idea of Olver and Rosenau with the classification of second and third order homogeneous Hamiltonian operators we classify compatible trios of two-component homogeneous Hamiltonian operators. The trios yield pairs of…

Mathematical Physics · Physics 2018-02-19 P. Lorenzoni , A. Savoldi , R. Vitolo

Four integrable symplectic maps approximating two Hamiltonian flows from the relativistic Toda hierarchy are introduced. They are demostrated to belong to the same hierarchy and to examplify the general scheme for symplectic maps on groups…

solv-int · Physics 2009-10-28 Yuri B. Suris

Let $D$ and $U$ be linear operators in a vector space (or more generally, elements of an associative algebra with a unit). We establish binomial-type identities for $D$ and $U$ assuming that either their commutator $[D,U]$ or the second…

Classical Analysis and ODEs · Mathematics 2018-01-17 Peter Kuchment , Sergey Lvin

We construct the tri-Hamiltonian structure of the two-dimensional Toda hierarchy using the R-matrix theory.

Mathematical Physics · Physics 2015-12-14 Guido Carlet

In this paper a list of $R$-matrices on a certain coupled Lie algebra is obtained. With one of these $R$-matrices, we construct infinitely many bi-Hamiltonian structures for each of the two-component BKP and the Toda lattice hierarchies. We…

Exactly Solvable and Integrable Systems · Physics 2013-05-07 Chao-Zhong Wu

We develop new constructions of 2D classical and quantum superintegrable Hamiltonians allowing separation of variables in Cartesian coordinates. In classical mechanics we start from two functions on a one-dimensional phase space, a natural…

Mathematical Physics · Physics 2019-02-18 Ian Marquette , Masoumeh Sajedi , Pavel Winternitz

We study a class of nonlinear PDEs that admit the same bi-Hamiltonian structure as WDVV equations: a Ferapontov-type first-order Hamiltonian operator and a homogeneous third-order Hamiltonian operator in a canonical Doyle--Potemin form,…

Exactly Solvable and Integrable Systems · Physics 2024-10-31 S. Opanasenko , R. Vitolo

We constructed the three nonequivalent gradings in the algebra $D_4 \simeq so(8)$. The first one is the standard one obtained with the Coxeter automorphism $C_1=S_{\alpha_2} S_{\alpha_1}S_{\alpha_3}S_{\alpha_4}$ using its dihedral…

Exactly Solvable and Integrable Systems · Physics 2020-10-28 V. S. Gerdjikov , A. A. Stefanov , I. D. Iliev , G. P. Boyadjiev , A. O. Smirnov , V. B. Matveev , M. V. Pavlov