Norton Lee scite author profile

We systematically study the interesting relations between the quantum elliptic Calogero-Moser system (eCM) and its generalization, and their corresponding supersymmetric gauge theories. In particular, we construct the suitable characteristic polynomial for the eCM system by considering certain orbifolded instanton partition function of the corresponding gauge theory. This is equivalent to the introduction of certain co-dimension two defects. We next generalize our construction to the folded instanton partition function obtained through the so-called "gauge origami" construction and precisely obtain the corresponding characteristic polynomial for the doubled version, named the elliptic double Calogero-Moser (edCM) system. X-function in this case. Finally we demonstrate the validity of X-function by recovering the correct commuting Hamiltonians which are expressed in terms of the Dunkl operators generalized to the edCM system. We should comment here that the connection between edCM systems and the so-called "folded instanton" configuration derived from gauge origami construction was noticed in [7], in this work we firmly established this connection by working out the relevant details in steps.We discuss various future directions in Section 6. We relegate our various definitions of functions and some of the computational details in a series of Appendices.1 This X-function itself is also known as the fundamental q-character of A 0 quiver constructed in [14]. See also [15] for another construction through the quantum toroidal algebra of gl 1 . As mentioned in this paper, we need to consider the orbifolded version of the X-function in order to extract the commuting Hamiltonians of the eCM system. 2 The trigonometric version is studied, e.g., in [20,21]. 3 ゲージ折紙 (日本語); 規範摺紙 (中文繁體字); 规范折纸 (中文简体字).(2.12)where the symbol PV means the principal value integral. In 2 → 0 limit, the integration should be dominated by saddle point configurations, which yield:dyG(x αi − y)ρ(y) + log(qR(x αi )) = 0.(2.13)

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Quantum spin systems and supersymmetric gauge theories. Part I

Lee

Nekrasov

2021

J. High Energ. Phys.

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The relation between supersymmetric gauge theories in four dimensions and quantum spin systems is exploited to find an explicit formula for the Jost function of the N site $$ \mathfrak{sl} $$ sl 2X X X spin chain (for infinite dimensional complex spin representations), as well as the SLN Gaudin system, which reduces, in a limiting case, to that of the N-particle periodic Toda chain. Using the non-perturbative Dyson-Schwinger equations of the supersymmetric gauge theory we establish relations between the spin chain commuting Hamiltonians with the twisted chiral ring of gauge theory. Along the way we explore the chamber dependence of the supersymmetric partition function, also the expectation value of the surface defects, giving new evidence for the AGT conjecture.

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Quantum integrable systems from supergroup gauge theories

Chen¹,

Kimura²,

Lee³

2020

J. High Energ. Phys.

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In this note, we establish several interesting connections between the super- group gauge theories and the super integrable systems, i.e. gauge theories with supergroups as their gauge groups and integrable systems defined on superalgebras. In particular, we construct the super-characteristic polynomials of super-Toda lattice and elliptic double Calogero-Moser system by considering certain orbifolded instanton partition functions of their corresponding supergroup gauge theories. We also derive an exotic generalization of 𝔰𝔩(2) XXX spin chain arising from the instanton partition function of SQCD with super- gauge group, and study its Bethe ansatz equation.

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Intersecting defects in gauge theory, quantum spin chains, and Knizhnik-Zamolodchikov equations

Jeong

Lee

Nekrasov

2021

J. High Energ. Phys.

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We propose an interesting BPS/CFT correspondence playground: the correlation function of two intersecting half-BPS surface defects in four-dimensional $$ \mathcal{N} $$ N = 2 supersymmetric SU(N) gauge theory with 2N fundamental hypermultiplets. We show it satisfies a difference equation, the fractional quantum T-Q relation. Its Fourier transform is the 5-point conformal block of the $$ {\hat{\mathfrak{sl}}}_N $$ sl ̂ N current algebra with one of the vertex operators corresponding to the N-dimensional $$ {\mathfrak{sl}}_N $$ sl N representation, which we demonstrate with the help of the Knizhnik-Zamolodchikov equation. We also identify the correlator with a state of the $$ {XXX}_{{\mathfrak{sl}}_2} $$ XXX sl 2 spin chain of N Heisenberg-Weyl modules over Y ($$ {\mathfrak{sl}}_2 $$ sl 2 ). We discuss the associated quantum Lax operators, and connections to isomonodromic deformations.

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Connecting localization and wall-crossing via D-branes

et al. 2018

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We demonstrate explicitly that the vacuum expectation values (vevs) of BPS line operators in 4d N = 2 super Yang-Mills theory compactified on a circle, computed by localization techniques, can be expanded in terms of Darboux coordinates as proposed by Gaiotto, Moore, and Neitzke [1]. However, we need to refine the expansion by including additional novel monopole bubbling contributions to obtain a precise match. Using D-brane realization of these singular BPS line operators, we derive and incorporate the monopole bubbling contributions as well as predict the degeneracies of framed BPS states contributing to the line operator vevs in the limit of vanishing simultaneous spatial and R-symmetry rotation fugacity parameter.

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Norton Lee

Quantum elliptic Calogero-Moser systems from gauge origami

Quantum spin systems and supersymmetric gauge theories. Part I

Quantum integrable systems from supergroup gauge theories

Intersecting defects in gauge theory, quantum spin chains, and Knizhnik-Zamolodchikov equations

Connecting localization and wall-crossing via D-branes

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