Abstract
We report on the results of our work [1], which discusses \(\mathcal{N} = 2\) nonlinear sigma models on the quadrics of the Grassmann manifold and three-pronged junctions of the mass-deformed nonlinear sigma models on \(SO(8){\text{/}}U(4)\) and \(Sp(3){\text{/}}U(3)\). This article is prepared for the Proceedings of International Workshop “Supersymmetries and Quantum Symmetries—SQS’2019”, which was held in Yerevan from 26 to 31 August, 2019. The talk was based on [1].
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REFERENCES
T. Kim and S. Shin, “Junctions of the mass-deformed nonlinear sigma models on SO(2N)/U(N) and Sp(N)/U(N),” arXiv: 1909.07017 [hep-th].
S. Shin, “Vacua, walls and junctions in GNf,Nc,” Nucl. Phys. B 946, 114701 (2019);
S. Shin, “Junctions of mass-deformed nonlinear sigma models on the Grassmann manifold,” J. High Energy Phys. 1908, 111 (2019).
U. Lindstrom and M. Rocek, “Scalar tensor duality and N=1,2 non-linear σ-models,” Nucl. Phys. B 222, 285 (1983).
M. Arai, M. Naganuma, M. Nitta, and N. Sakai, “Manifest supersymmetry for BPS walls in N = 2 nonlinear sigma models,” Nucl. Phys. B 652, 35 (2003).
M. Arai, M. Nitta, and N. Sakai, “Vacua of massive hyper-Kähler sigma models of non-Abelian quotient,” Prog. Theor. Phys. 113, 657 (2005).
K. Higashijima and M. Nitta, “Supersymmetric nonlinear sigma models as gauge theories,” Prog. Theor. Phys. 103, 635 (2000).
B. H. Lee, C. Park, and S. Shin, “Vacua and walls of mass-deformed Kähler nonlinear sigma models on SO(2N)/U(N),” Phys. Rev. D 96, 105017 (2017).
M. Arai, A. Golubtsova, C. Park, and S. Shin, “Vacua and walls of mass-deformed Kähler nonlinear sigma models on Sp(N)/U(N),” Phys. Rev. D 97, 105012 (2018).
M. Arai and S. Shin, “Walls of massive Kähler sigma models on SO(2N)/U(N) and Sp(N)/U(N),” Phys. Rev. D. 83, 125003 (2011).
Y. Isozumi, M. Nitta, K. Ohashi, and N. Sakai, “Construction of non-Abelian walls and their complete moduli space,” Phys. Rev. Lett. 93, 161601 (2004);
Y. Isozumi, M. Nitta, K. Ohashi, and N. Sakai, “Non-Abelian walls in supersymmetric gauge theories,” Phys. Rev. D 70, 125014 (2004).
M. Eto, Y. Isozumi, M. Nitta, K. Ohashi, and N. Sakai, “Webs of walls,” Phys. Rev. D 72, 085004 (2005);
M. Eto, Y. Isozumi, M. Nitta, K. Ohashi, and N. Sakai, “Non-Abelian webs of walls,” Phys. Lett. B 632, 384 (2006).
N. Sakai and D. Tong, “Monopoles, vortices, domain walls and D-branes: The rules of interaction,” J. High Energy Phys. 0503, 019 (2005).
M. Eto, T. Fujimori, S. B. Gudnason, Y. Jiang, K. Konishi, M. Nitta, and K. Ohashi, “Vortices and monopoles in mass-deformed SO and USp gauge theories,” J. High Energy Phys. 1112, 017 (2011).
A. Isaev and V. Rubakov, Theory of Groups and Symmetries (World Scientific, Singapore, 2018).
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Kim, T., Shin, S. Three-Pronged Junctions on SO(2N)/U(N) and Sp(N)/U(N). Phys. Part. Nuclei Lett. 17, 666–670 (2020). https://doi.org/10.1134/S1547477120050222
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DOI: https://doi.org/10.1134/S1547477120050222