This publication is cited in the following articles:
Dmitry Galakhov, Alexei Morozov, “Tunnels under geometries (or instantons know their algebras)”, J. High Energ. Phys., 2025:5 (2025)
Sung-Soo Byun, Peter J. Forrester, “On the superintegrability of the Gaussian $\beta $ ensemble and its (q, t) generalisation”, Ramanujan J, 68:3 (2025)
Edoardo Vescovi, Konstantin Zarembo, “Loop equations for generalised eigenvalue models”, SciPost Phys., 17:1 (2024)
Peter J. Forrester, “A review of exact results for fluctuation formulas in random matrix theory”, Probab. Surveys, 20:none (2023)
Peter J. Forrester, “High–low temperature dualities for the classical β-ensembles”, Random Matrices: Theory Appl., 11:04 (2022)
Dmitry Galakhov, “On supersymmetric interface defects, brane parallel transport, order-disorder transition and homological mirror symmetry”, J. High Energ. Phys., 2022:10 (2022)
Bruno Le Floch, “A slow review of the AGT correspondence”, J. Phys. A: Math. Theor., 55:35 (2022), 353002
Forrester P.J., Mazzuca G., “The Classical Beta-Ensembles With Beta Proportional to 1/N: From Loop Equations to Dyson'S Disordered Chain”, J. Math. Phys., 62:7 (2021), 073505
Morozov A., “On W-Representations of Beta- and Q, T-Deformed Matrix Models”, Phys. Lett. B, 792 (2019), 205–213
Chen Y., Kang B., Li M.-L., Wang L.-F., Zhang Ch.-H., “Correlators in the Beta-Deformed Gaussian Hermitian and Complex Matrix Models”, Int. J. Mod. Phys. A, 34:33 (2019), 1950221
G. Bonelli, K. Maruyoshi, A. Tanzini, “Quantum Hitchin systems via $\beta$-deformed matrix models”, Commun. Math. Phys., 358:3 (2018), 1041–1064
Mironov A. Morozov A., “Sum Rules For Characters From Character-Preservation Property of Matrix Models”, J. High Energy Phys., 2018, no. 8, 163
Morozov A., Popolitov A., Shakirov Sh., “On (Q, T)-Deformation of Gaussian Matrix Model”, Phys. Lett. B, 784 (2018), 342–344
M. Manabe, P. Sulkowski, “Quantum curves and conformal field theory”, Phys. Rev. D, 95:12 (2017), 126003
F. Mezzadri, A. K. Reynolds, B. Winn, “Moments of the eigenvalue densities and of the secular coefficients of $\beta$-ensembles”, Nonlinearity, 30:3 (2017), 1034–1057
A. Mironov, A. Morozov, Y. Zenkevich, “_orig ding-iohara-miki symmetry of network matrix models”, Phys. Lett. B, 762 (2016), 196–208
H. Awata, H. Kanno, T. Matsumoto, A. Mironov, A. Morozov, A. Morozov Yu. Ohkubo, Y. Zenkevich, “Explicit examples of DIM constraints for network matrix models”, J. High Energy Phys., 2016, no. 7, 103
N. S. Witte, P. J. Forrester, “Loop equation analysis of the circular $\beta$ ensembles”, J. High Energy Phys., 2015, no. 2, 173
I. Rumanov, “Classical integrability for $\beta$-ensembles and general Fokker-Planck equations”, J. Math. Phys., 56:1 (2015), 013508
H. Itoyama, R. Yoshioka, “Developments of theory of effective prepotential from extended Seiberg-Witten system and matrix models”, Prog. Theor. Exp. Phys., 2015, no. 11, 11B103
A. Gorsky, A. Milekhin, “RG-Whitham dynamics and complex Hamiltonian systems”, Nuclear Physics B, 895 (2015), 33
N. S. Witte, P. J. Forrester, “Moments of the Gaussian $\beta$ ensembles and the large-$N$ expansion of the densities”, J. Math. Phys., 55:8 (2014), 083302
N. Nemkov, “S-duality as Fourier transform for arbitrary $\epsilon_1, \epsilon_2$”, J. Phys. A-Math. Theor., 47:10 (2014), 105401
M.-X. Huang, “Dijkgraaf-Vafa conjecture and $\beta$-deformed matrix models”, J. High Energy Phys., 2013, no. 7, 173
L. Chekhov, B. Eynard, S. Ribault, “Seiberg-Witten equations and non-commutative spectral curves in Liouville theory”, J. Math. Phys., 54:2 (2013), 022306
F. Fucito, J. F. Morales, D. R. Pacifici, “Deformed Seiberg-Witten curves for ADE quivers”, J. High Energy Phys., 2013, no. 1, 091
A. Yu. Morozov, “Challenges of $\beta$-deformation”, Theoret. and Math. Phys., 173:1 (2012), 1417–1437
D. Krefl, J. Walcher, “ABCD of beta ensembles and topological strings”, J. High Energy Phys., 2012, no. 11, 111, 27 pp.
M. Aganagic, M. C. N. Cheng, R. Dijkgraaf, D. Krefl, C. Vafa, “Quantum geometry of refined topological strings”, J. High Energy Phys., 2012, no. 11, 019, 52 pp.
