Your search keyword '"Frassek, Rouven"' showing total 14 results

1. The steady state of the boundary-driven multiparticle asymmetric diffusion model

Author

Frassek, Rouven and Szécsényi, István M.

Subjects

Mathematical Physics, Condensed Matter - Statistical Mechanics, High Energy Physics - Theory, Mathematics - Probability, Nonlinear Sciences - Exactly Solvable and Integrable Systems

Abstract

We consider the multiparticle asymmetric diffusion model (MADM) introduced by Sasamoto and Wadati with integrability preserving reservoirs at the boundaries. In contrast to the open asymmetric simple exclusion process (ASEP) the number of particles allowed per site is unbounded in the MADM. Taking inspiration from the stationary measure in the symmetric case, i.e. the rational limit, we first obtain the length 1 solution and then show that the steady state can be expressed as an iterated product of Jackson q-integrals. In the proof of the stationarity condition, we observe a cancellation mechanism that closely resembles the one of the matrix product ansatz. To our knowledge, the occupation probabilities in the steady state of the boundary-driven MADM were not available before., Comment: 13 pages; v2: references added, text improved

Published

2023

2. Orthosymplectic superoscillator Lax matrices

Author

Frassek, Rouven and Tsymbaliuk, Alexander

Subjects

Mathematical Physics, High Energy Physics - Theory, Mathematics - Quantum Algebra, Mathematics - Representation Theory, Nonlinear Sciences - Exactly Solvable and Integrable Systems

Abstract

We construct Lax matrices of superoscillator type that are solutions of the RTT-relation for the rational orthosymplectic $R$-matrix, generalizing orthogonal and symplectic oscillator type Lax matrices previously constructed by the authors in arXiv:2001.06825, arXiv:2104.14518, and arXiv:2112.12065. We further establish factorisation formulas among the presented solutions., Comment: v1: 25 pages, comments are welcome! v2: 26 pages, minor corrections, details added (including a new Appendix)

Published

2023

3. Algebraic Bethe ansatz for Q-operators of the open XXX Heisenberg chain with arbitrary spin

Author

Frassek, Rouven and Szécsényi, István M.

Subjects

Mathematical Physics, Condensed Matter - Statistical Mechanics, High Energy Physics - Theory, Nonlinear Sciences - Exactly Solvable and Integrable Systems

Abstract

In this note we construct Q-operators for the spin s open Heisenberg XXX chain with diagonal boundaries in the framework of the quantum inverse scattering method. Following the algebraic Bethe ansatz we diagonalise the introduced Q-operators using the fundamental commutation relations. By acting on Bethe off-shell states and explicitly evaluating the trace in the auxiliary space we compute the eigenvalues of the Q-operators in terms of Bethe roots and show that the unwanted terms vanish if the Bethe equations are satisfied., Comment: 17 pages

Published

2022

4. Integrable boundaries for the q-Hahn process

Author

Frassek, Rouven

Subjects

Mathematical Physics, Condensed Matter - Statistical Mechanics, Mathematics - Probability, Nonlinear Sciences - Exactly Solvable and Integrable Systems

Abstract

Taking inspiration from the harmonic process with reservoirs introduced by Giardin\`a, Kurchan and the author in arXiv:1904.01048, we propose integrable boundary conditions for its trigonometric deformation which is known as the q-Hahn process. Following the formalism established by Mangazeev and Lu in arXiv:1903.00274 using the stochastic R-matrix, we argue that the proposed boundary conditions can be derived from a transfer matrix constructed in the framework of Sklyanin's extension of the quantum inverse scattering method and consequently preserve the integrable structure of the model. The approach avoids the explicit construction of the K-matrix., Comment: v1: One figure and 16 pages v2: added symmetric limit and improved conclusion

Published

2022

5. Exact solution of an integrable non-equilibrium particle system

Author

Frassek, Rouven and Giardinà, Cristian

Subjects

Mathematical Physics, Condensed Matter - Statistical Mechanics, High Energy Physics - Theory, Mathematics - Probability, Nonlinear Sciences - Exactly Solvable and Integrable Systems

Abstract

We consider the integrable family of symmetric boundary-driven interacting particle systems that arise from the non-compact XXX Heisenberg model in one dimension with open boundaries. In contrast to the well-known symmetric exclusion process, the number of particles at each site is unbounded. We show that a finite chain of $N$ sites connected at its ends to two reservoirs can be solved exactly, i.e. the factorial moments of the non-equilibrium steady-state can be written in closed form for each $N$. The solution relies on probabilistic arguments and techniques inspired by integrable systems. It is obtained in two steps: i) the introduction of a dual absorbing process reducing the problem to a finite number of particles; ii) the solution of the dual dynamics exploiting a symmetry obtained from the Quantum Inverse Scattering Method. Long-range correlations are computed in the finite-volume system. The exact solution allows to prove by a direct computation that, in the thermodynamic limit, the system approaches local equilibrium. A by-product of the solution is the algebraic construction of a direct mapping between the non-equilibrium steady state and the equilibrium reversible measure., Comment: 45 pages, 2 figures, v2: minor improvements, v3: typo fixed

Published

2021

6. Rational Lax matrices from antidominantly shifted extended Yangians: BCD types

Author

Frassek, Rouven and Tsymbaliuk, Alexander

Subjects

Mathematics - Representation Theory, Mathematical Physics, Nonlinear Sciences - Exactly Solvable and Integrable Systems

Abstract

Generalizing our recent joint paper with Vasily Pestun (arXiv:2001.04929), we construct a family of $SO(2r),Sp(2r),SO(2r+1)$ rational Lax matrices, polynomial in the spectral parameter, parametrized by the divisors on the projective line with coefficients being dominant integral coweights of associated Lie algebras. To this end, we provide the RTT realization of the antidominantly shifted extended Drinfeld Yangians of $\mathfrak{so}_{2r}, \mathfrak{sp}_{2r}, \mathfrak{so}_{2r+1}$, and of their coproduct homomorphisms. This establishes some of the recent conjectures in the physics literature by Costello-Gaiotto-Yagi (arXiv:2103.01835) in the classical types., Comment: v3: 67 pages, minor corrections, details added. v2: 65 pages, minor corrections, some details added, Remark 4.37 added. v1: 64 pages, comments are welcome!

Published

2021

7. Boundary Perimeter Bethe Ansatz

Author

Frassek, Rouven

Subjects

Mathematical Physics, High Energy Physics - Theory, Nonlinear Sciences - Exactly Solvable and Integrable Systems

Abstract

We study the partition function of the six-vertex model in the rational limit on arbitrary Baxter lattices with reflecting boundary. Every such lattice is interpreted as an invariant of the twisted Yangian. This identification allows us to relate the partition function of the vertex model to the Bethe wave function of an open spin chain. We obtain the partition function in terms of creation operators on a reference state from the algebraic Bethe ansatz and as a sum of permutations and reflections from the coordinate Bethe ansatz., Comment: 21 pages, 10 figures

Published

2017

8. An Integrability Primer for the Gauge-Gravity Correspondence: an Introduction

Author

Bombardelli, Diego, Cagnazzo, Alessandra, Frassek, Rouven, Levkovich-Maslyuk, Fedor, Loebbert, Florian, Negro, Stefano, Szécsényi, Istvan M., Sfondrini, Alessandro, van Tongeren, Stijn J., and Torrielli, Alessandro

Subjects

High Energy Physics - Theory, Condensed Matter - Strongly Correlated Electrons, Mathematical Physics, Nonlinear Sciences - Exactly Solvable and Integrable Systems

Abstract

We introduce a series of articles reviewing various aspects of integrable models relevant to the AdS/CFT correspondence. Topics covered in these reviews are: classical integrability, Yangian symmetry, factorized scattering, the Bethe ansatz, the thermodynamic Bethe ansatz, and integrable structures in (conformal) quantum field theory. In the present article we highlight how these concepts have found application in AdS/CFT, and provide a brief overview of the material contained in this series., Comment: v2, published version

Published

2016

9. Yangian-type symmetries of non-planar leading singularities

Author

Frassek, Rouven and Meidinger, David

Subjects

High Energy Physics - Theory, Mathematical Physics, Nonlinear Sciences - Exactly Solvable and Integrable Systems

Abstract

We take up the study of integrable structures behind non-planar contributions to scattering amplitudes in N=4 super Yang-Mills theory. Focusing on leading singularities, we derive the action of the Yangian generators on color-ordered subsets of the external states. Each subset corresponds to a single boundary of the non-planar on-shell diagram. While Yangian invariance is broken, we find that higher-level Yangian generators still annihilate the non-planar on-shell diagram. For a given diagram, the number of these generators is governed by the degree of non-planarity. Furthermore, we present additional identities involving integrable transfer matrices. In particular, for diagrams on a cylinder we obtain a conservation rule similar to the Yangian invariance condition of planar on-shell diagrams. To exemplify our results, we consider a five-point MHV on-shell function on a cylinder., Comment: 6 pages, 3 figures

Published

2016

10. Q-operators for the open Heisenberg spin chain

Author

Frassek, Rouven and Szecsenyi, Istvan M.

Subjects

Mathematical Physics, Condensed Matter - Statistical Mechanics, High Energy Physics - Theory, Nonlinear Sciences - Exactly Solvable and Integrable Systems

Abstract

We construct Q-operators for the open spin-1/2 XXX Heisenberg spin chain with diagonal boundary matrices. The Q-operators are defined as traces over an infinite-dimensional auxiliary space involving novel types of reflection operators derived from the boundary Yang-Baxter equation. We argue that the Q-operators defined in this way are polynomials in the spectral parameter and show that they commute with transfer matrix. Finally, we prove that the Q-operators satisfy Baxter's TQ-equation and derive the explicit form of their eigenvalues in terms of the Bethe roots., Comment: 23 pages, 1 figure; v2: refs added, minor changes; v3: refs added, summary and text improved

Published

2015

11. Algebraic Bethe ansatz for Q-operators: The Heisenberg spin chain

Author

Frassek, Rouven

Subjects

Mathematical Physics, Condensed Matter - Statistical Mechanics, High Energy Physics - Theory, Nonlinear Sciences - Exactly Solvable and Integrable Systems

Abstract

We diagonalize Q-operators for rational homogeneous sl(2)-invariant Heisenberg spin chains using the algebraic Bethe ansatz. After deriving the fundamental commutation relations relevant for this case from the Yang-Baxter equation we demonstrate that the Q-operators act diagonally on the Bethe vectors if the Bethe equations are satisfied. In this way we provide a direct proof that the eigenvalues of the Q-operators studied here are given by Baxter's Q-functions., Comment: 20 pages; v2: typo fixed

Published

2015

12. Q-operators, Yangian invariance and the quantum inverse scattering method

Author

Frassek, Rouven

Subjects

High Energy Physics - Theory, Mathematical Physics, Nonlinear Sciences - Exactly Solvable and Integrable Systems

Abstract

Inspired by the integrable structures appearing in weakly coupled planar N=4 super Yang-Mills theory, we study Q-operators and Yangian invariants of rational integrable spin chains. We review the quantum inverse scattering method along with the Yang-Baxter equation which is the key relation in this systematic approach to study integrable models. Our main interest concerns rational integrable spin chains and lattice models. We recall the relation among them and how they can be solved using Bethe ansatz methods incorporating so-called Q-functions. In order to remind the reader how the Yangian emerges in this context, an overview of its so-called RTT-realization is provided. The main part is based on the author's original publications. Firstly, we construct Q-operators whose eigenvalues yield the Q-functions for rational homogeneous spin chains. The Q-operators are introduced as traces over certain monodromies of R-operators. Our construction allows us to derive the hierarchy of commuting Q-operators and the functional relations among them. We study how the nearest-neighbor Hamiltonian and in principle also higher local charges can be extracted from the Q-operators directly. Secondly, we formulate the Yangian invariance condition, also studied in relation to scattering amplitudes of N=4 super Yang-Mills theory, in the RTT-realization. We find that Yangian invariants can be interpreted as special eigenvectors of certain inhomogeneous spin chains. This allows us to apply the algebraic Bethe ansatz and derive the corresponding Bethe equations that are relevant to construct the invariants. We examine the connection between the Yangian invariant spin chain eigenstates whose components can be understood as partition functions of certain 2d lattice models and tree-level scattering amplitudes of the four-dimensional gauge theory. Finally, we conclude and discuss some future directions., Comment: 212 pages, PhD thesis based on the author's publications arXiv:1010.3699, arXiv:1012.6021, arXiv:1112.3600, arXiv:1207.4513 and arXiv:1312.1693

Published

2014

13. Bethe Ansatz for Yangian Invariants: Towards Super Yang-Mills Scattering Amplitudes

Author

Frassek, Rouven, Kanning, Nils, Ko, Yumi, and Staudacher, Matthias

Subjects

Mathematical Physics, Condensed Matter - Statistical Mechanics, High Energy Physics - Theory, Nonlinear Sciences - Exactly Solvable and Integrable Systems

Abstract

We propose that Baxter's Z-invariant six-vertex model at the rational gl(2) point on a planar but in general not rectangular lattice provides a way to study Yangian invariants. These are identified with eigenfunctions of certain monodromies of an auxiliary inhomogeneous spin chain. As a consequence they are special solutions to the eigenvalue problem of the associated transfer matrix. Excitingly, this allows to construct them using Bethe ansatz techniques. Conceptually, our construction generalizes to general (super) Lie algebras and general representations. Here we present the explicit form of sample invariants for totally symmetric, finite-dimensional representations of gl(n) in terms of oscillator algebras. In particular, we discuss invariants of three- and four-site monodromies that can be understood respectively as intertwiners of the bootstrap and Yang-Baxter equation. We state a set of functional relations significant for these representations of the Yangian and discuss their solutions in terms of Bethe roots. They arrange themselves into exact strings in the complex plane. In addition, it is shown that the sample invariants can be expressed analogously to Grassmannian integrals. This aspect is closely related to a recent on-shell formulation of scattering amplitudes in planar N=4 super Yang-Mills theory., Comment: 56 pages, 14 figures; v2: appendix B added, references updated and typos fixed; v3: published version

Published

2013

14. From Baxter Q-Operators to Local Charges

Author

Frassek, Rouven and Meneghelli, Carlo

Subjects

High Energy Physics - Theory, Condensed Matter - Statistical Mechanics, Mathematical Physics, Nonlinear Sciences - Exactly Solvable and Integrable Systems

Abstract

We discuss how the shift operator and the Hamiltonian enter the hierarchy of Baxter Q-operators in the example of gl(n) homogeneous spin-chains. Building on the construction that was recently carried out by the authors and their collaborators, we find that a reduced set of Q-operators can be used to obtain local charges. The mechanism relies on projection properties of the corresponding R-operators on a highest/lowest weight state of the quantum space. It is intimately related to the ordering of the oscillators in the auxiliary space. Furthermore, we introduce a diagrammatic language that makes these properties manifest and the results transparent. Our approach circumvents the paradigm of constructing the transfer matrix with equal representations in quantum and auxiliary space and underlines the strength of the Q-operator construction., Comment: 24 pages, several figures; v2: references added and typos fixed; v3: accepted in J. Stat. Mech

Published

2012