[{"status":"public","abstract":[{"text":"We introduce a new class of reflection groups associated with the canonical bilinear lattices of Lenzing, which we call reflection groups of canonical type. The main result of this work is a categorification of the corresponding poset of non-crossing partitions for any such group, realized via the poset of thick subcategories of the category of coherent sheaves on an exceptional hereditary curve generated by an exceptional sequence. A second principal result, essential for the categorification, is a proof of the transitivity of the Hurwitz action in these reflection groups.","lang":"eng"}],"type":"preprint","publication":"arXiv:2512.01729","language":[{"iso":"eng"}],"user_id":"103440","_id":"63620","external_id":{"arxiv":["2512.01729"]},"citation":{"ama":"Baumeister B, Burban I, Neaime G, Schwabe CM. Non-crossing partitions for exceptional hereditary curves. arXiv:251201729. Published online 2025.","ieee":"B. Baumeister, I. Burban, G. Neaime, and C. M. Schwabe, “Non-crossing partitions for exceptional hereditary curves,” arXiv:2512.01729. 2025.","chicago":"Baumeister, Barbara, Igor Burban, Georges Neaime, and Charly Merlin Schwabe. “Non-Crossing Partitions for Exceptional Hereditary Curves.” ArXiv:2512.01729, 2025.","mla":"Baumeister, Barbara, et al. “Non-Crossing Partitions for Exceptional Hereditary Curves.” ArXiv:2512.01729, 2025.","bibtex":"@article{Baumeister_Burban_Neaime_Schwabe_2025, title={Non-crossing partitions for exceptional hereditary curves}, journal={arXiv:2512.01729}, author={Baumeister, Barbara and Burban, Igor and Neaime, Georges and Schwabe, Charly Merlin}, year={2025} }","short":"B. Baumeister, I. Burban, G. Neaime, C.M. Schwabe, ArXiv:2512.01729 (2025).","apa":"Baumeister, B., Burban, I., Neaime, G., & Schwabe, C. M. (2025). Non-crossing partitions for exceptional hereditary curves. In arXiv:2512.01729."},"year":"2025","title":"Non-crossing partitions for exceptional hereditary curves","author":[{"first_name":"Barbara","last_name":"Baumeister","full_name":"Baumeister, Barbara"},{"first_name":"Igor","last_name":"Burban","id":"72064","full_name":"Burban, Igor"},{"last_name":"Neaime","full_name":"Neaime, Georges","first_name":"Georges"},{"first_name":"Charly Merlin","last_name":"Schwabe","id":"103440","full_name":"Schwabe, Charly Merlin"}],"date_created":"2026-01-15T09:37:34Z","date_updated":"2026-01-16T09:09:17Z"},{"_id":"44328","user_id":"49063","department":[{"_id":"602"}],"article_number":"108273","language":[{"iso":"eng"}],"type":"journal_article","publication":"Advances in Mathematics","abstract":[{"lang":"eng","text":"In this paper, we study equivalences between the categories of quasi–coherent sheaves on non–commutative noetherian schemes. In particular, we give a new proof of Căldăraru's conjecture about Morita equivalences of Azumaya algebras on noetherian schemes. Moreover, we derive necessary and sufficient condition for two reduced non–commutative curves to be Morita equivalent."}],"status":"public","date_updated":"2023-05-07T01:35:27Z","date_created":"2023-05-02T18:34:25Z","author":[{"last_name":"Burban","full_name":"Burban, Igor","id":"72064","first_name":"Igor"},{"first_name":"Yu.","last_name":"Drozd","full_name":"Drozd, Yu."}],"volume":399,"title":"Morita theory for non-commutative noetherian schemes","doi":"10.1016/j.aim.2022.108273","publication_status":"published","year":"2022","citation":{"short":"I. Burban, Yu. Drozd, Advances in Mathematics 399 (2022).","mla":"Burban, Igor, and Yu. Drozd. “Morita Theory for Non-Commutative Noetherian Schemes.” Advances in Mathematics, vol. 399, 108273, 2022, doi:10.1016/j.aim.2022.108273.","bibtex":"@article{Burban_Drozd_2022, title={Morita theory for non-commutative noetherian schemes}, volume={399}, DOI={10.1016/j.aim.2022.108273}, number={108273}, journal={Advances in Mathematics}, author={Burban, Igor and Drozd, Yu.}, year={2022} }","apa":"Burban, I., & Drozd, Yu. (2022). Morita theory for non-commutative noetherian schemes. Advances in Mathematics, 399, Article 108273. https://doi.org/10.1016/j.aim.2022.108273","chicago":"Burban, Igor, and Yu. Drozd. “Morita Theory for Non-Commutative Noetherian Schemes.” Advances in Mathematics 399 (2022). https://doi.org/10.1016/j.aim.2022.108273.","ieee":"I. Burban and Yu. Drozd, “Morita theory for non-commutative noetherian schemes,” Advances in Mathematics, vol. 399, Art. no. 108273, 2022, doi: 10.1016/j.aim.2022.108273.","ama":"Burban I, Drozd Yu. Morita theory for non-commutative noetherian schemes. Advances in Mathematics. 2022;399. doi:10.1016/j.aim.2022.108273"},"intvolume":" 399"},{"main_file_link":[{"url":"https://doi.org/10.48550/arXiv.2207.02278"}],"title":"A classification of polyharmonic Maa forms via quiver representations","author":[{"last_name":"Burban","full_name":"Burban, Igor","id":"72064","first_name":"Igor"},{"first_name":"C.","full_name":"Alfes-Neumann, C.","last_name":"Alfes-Neumann"},{"full_name":"Raum, M.","last_name":"Raum","first_name":"M."}],"date_created":"2023-05-07T00:54:50Z","date_updated":"2023-05-07T01:37:00Z","citation":{"apa":"Burban, I., Alfes-Neumann, C., & Raum, M. (2022). A classification of polyharmonic Maa forms via quiver representations.","short":"I. Burban, C. Alfes-Neumann, M. Raum, (2022).","mla":"Burban, Igor, et al. A Classification of Polyharmonic Maa Forms via Quiver Representations. 2022.","bibtex":"@article{Burban_Alfes-Neumann_Raum_2022, title={A classification of polyharmonic Maa forms via quiver representations}, author={Burban, Igor and Alfes-Neumann, C. and Raum, M.}, year={2022} }","chicago":"Burban, Igor, C. Alfes-Neumann, and M. Raum. “A Classification of Polyharmonic Maa Forms via Quiver Representations,” 2022.","ieee":"I. Burban, C. Alfes-Neumann, and M. Raum, “A classification of polyharmonic Maa forms via quiver representations.” 2022.","ama":"Burban I, Alfes-Neumann C, Raum M. A classification of polyharmonic Maa forms via quiver representations. Published online 2022."},"year":"2022","publication_status":"published","language":[{"iso":"eng"}],"user_id":"49063","department":[{"_id":"602"}],"_id":"44537","status":"public","type":"preprint"},{"title":"On elliptic solutions of the associative Yang-Baxter equation","date_updated":"2023-05-07T01:41:35Z","author":[{"first_name":"Igor","id":"72064","full_name":"Burban, Igor","last_name":"Burban"},{"last_name":"Peruzzi","full_name":"Peruzzi, A.","first_name":"A."}],"date_created":"2023-05-02T18:32:49Z","volume":176,"year":"2022","citation":{"short":"I. Burban, A. Peruzzi, Journal of Geometry and Physics 176 (2022).","bibtex":"@article{Burban_Peruzzi_2022, title={On elliptic solutions of the associative Yang-Baxter equation}, volume={176}, number={104499}, journal={Journal of Geometry and Physics}, author={Burban, Igor and Peruzzi, A.}, year={2022} }","mla":"Burban, Igor, and A. Peruzzi. “On Elliptic Solutions of the Associative Yang-Baxter Equation.” Journal of Geometry and Physics, vol. 176, 104499, 2022.","apa":"Burban, I., & Peruzzi, A. (2022). On elliptic solutions of the associative Yang-Baxter equation. Journal of Geometry and Physics, 176, Article 104499.","ama":"Burban I, Peruzzi A. On elliptic solutions of the associative Yang-Baxter equation. Journal of Geometry and Physics. 2022;176.","chicago":"Burban, Igor, and A. Peruzzi. “On Elliptic Solutions of the Associative Yang-Baxter Equation.” Journal of Geometry and Physics 176 (2022).","ieee":"I. Burban and A. Peruzzi, “On elliptic solutions of the associative Yang-Baxter equation,” Journal of Geometry and Physics, vol. 176, Art. no. 104499, 2022."},"intvolume":" 176","publication_status":"published","article_number":"104499","language":[{"iso":"eng"}],"_id":"44327","user_id":"49063","department":[{"_id":"602"}],"status":"public","type":"journal_article","publication":"Journal of Geometry and Physics"},{"language":[{"iso":"eng"}],"user_id":"49063","department":[{"_id":"602"}],"_id":"44329","status":"public","abstract":[{"text":"This paper is devoted to algebro-geometric study of infinite dimensional Lie bialgebras, which arise from solutions of the classical Yang–Baxter equation. We regard trigonometric solutions of this equation as twists of the standard Lie bialgebra cobracket on an appropriate affine Lie algebra and work out the corresponding theory of Manin triples, putting it into an algebro-geometric context. As a consequence of this approach, we prove that any trigonometric solution of the classical Yang–Baxter equation arises from an appropriate algebro-geometric datum. The developed theory is illustrated by some concrete examples.","lang":"eng"}],"type":"journal_article","publication":"Communications in Mathematical Physics","doi":"10.1007/s00220-021-04188-7","title":"Algebraic geometry of Lie bialgebras defined by solutions of the classical Yang-Baxter equation","author":[{"first_name":"Igor","full_name":"Burban, Igor","id":"72064","last_name":"Burban"},{"last_name":"Abedin","full_name":"Abedin, R.","first_name":"R."}],"date_created":"2023-05-02T18:36:54Z","volume":387,"date_updated":"2023-05-07T01:35:11Z","citation":{"ama":"Burban I, Abedin R. Algebraic geometry of Lie bialgebras defined by solutions of the classical Yang-Baxter equation. Communications in Mathematical Physics. 2021;387(2):1051–1109. doi:10.1007/s00220-021-04188-7","chicago":"Burban, Igor, and R. Abedin. “Algebraic Geometry of Lie Bialgebras Defined by Solutions of the Classical Yang-Baxter Equation.” Communications in Mathematical Physics 387, no. 2 (2021): 1051–1109. https://doi.org/10.1007/s00220-021-04188-7.","ieee":"I. Burban and R. Abedin, “Algebraic geometry of Lie bialgebras defined by solutions of the classical Yang-Baxter equation,” Communications in Mathematical Physics, vol. 387, no. 2, pp. 1051–1109, 2021, doi: 10.1007/s00220-021-04188-7.","short":"I. Burban, R. Abedin, Communications in Mathematical Physics 387 (2021) 1051–1109.","mla":"Burban, Igor, and R. Abedin. “Algebraic Geometry of Lie Bialgebras Defined by Solutions of the Classical Yang-Baxter Equation.” Communications in Mathematical Physics, vol. 387, no. 2, 2021, pp. 1051–1109, doi:10.1007/s00220-021-04188-7.","bibtex":"@article{Burban_Abedin_2021, title={Algebraic geometry of Lie bialgebras defined by solutions of the classical Yang-Baxter equation}, volume={387}, DOI={10.1007/s00220-021-04188-7}, number={2}, journal={Communications in Mathematical Physics}, author={Burban, Igor and Abedin, R.}, year={2021}, pages={1051–1109} }","apa":"Burban, I., & Abedin, R. (2021). Algebraic geometry of Lie bialgebras defined by solutions of the classical Yang-Baxter equation. Communications in Mathematical Physics, 387(2), 1051–1109. https://doi.org/10.1007/s00220-021-04188-7"},"page":"1051–1109","intvolume":" 387","year":"2021","issue":"2","publication_status":"published"},{"department":[{"_id":"602"}],"user_id":"49063","_id":"44331","language":[{"iso":"eng"}],"publication":"Proceedings of the London Mathematical Society","type":"journal_article","status":"public","abstract":[{"text":"In this paper, we study properties of the algebras of planar quasi-invariants. These algebras are Cohen–Macaulay and Gorenstein in codimension one. Using the technique of matrix problems, we classify all Cohen–Macaulay modules of rank one over them and determine their Picard groups. In terms of this classification, we describe the spectral modules of the planar rational Calogero–Moser systems. Finally, we elaborate the theory of the algebraic inverse scattering method, providing explicit computations of some ‘isospectral deformations’ of the planar rational Calogero–Moser system in the case of the split rational potential.","lang":"eng"}],"volume":121,"author":[{"full_name":"Burban, Igor","id":"72064","last_name":"Burban","first_name":"Igor"},{"full_name":"Zheglov, A.","last_name":"Zheglov","first_name":"A."}],"date_created":"2023-05-02T18:47:19Z","date_updated":"2023-05-07T01:30:54Z","doi":"10.1112/plms.12341","title":"Cohen-Macaulay modules over the algebra of planar quasi-invariants and Calogero-Moser systems","issue":"4","publication_status":"published","intvolume":" 121","page":"1033–1082","citation":{"ama":"Burban I, Zheglov A. Cohen-Macaulay modules over the algebra of planar quasi-invariants and Calogero-Moser systems. Proceedings of the London Mathematical Society. 2020;121(4):1033–1082. doi:10.1112/plms.12341","chicago":"Burban, Igor, and A. Zheglov. “Cohen-Macaulay Modules over the Algebra of Planar Quasi-Invariants and Calogero-Moser Systems.” Proceedings of the London Mathematical Society 121, no. 4 (2020): 1033–1082. https://doi.org/10.1112/plms.12341.","ieee":"I. Burban and A. Zheglov, “Cohen-Macaulay modules over the algebra of planar quasi-invariants and Calogero-Moser systems,” Proceedings of the London Mathematical Society, vol. 121, no. 4, pp. 1033–1082, 2020, doi: 10.1112/plms.12341.","apa":"Burban, I., & Zheglov, A. (2020). Cohen-Macaulay modules over the algebra of planar quasi-invariants and Calogero-Moser systems. Proceedings of the London Mathematical Society, 121(4), 1033–1082. https://doi.org/10.1112/plms.12341","bibtex":"@article{Burban_Zheglov_2020, title={Cohen-Macaulay modules over the algebra of planar quasi-invariants and Calogero-Moser systems}, volume={121}, DOI={10.1112/plms.12341}, number={4}, journal={Proceedings of the London Mathematical Society}, author={Burban, Igor and Zheglov, A.}, year={2020}, pages={1033–1082} }","short":"I. Burban, A. Zheglov, Proceedings of the London Mathematical Society 121 (2020) 1033–1082.","mla":"Burban, Igor, and A. Zheglov. “Cohen-Macaulay Modules over the Algebra of Planar Quasi-Invariants and Calogero-Moser Systems.” Proceedings of the London Mathematical Society, vol. 121, no. 4, 2020, pp. 1033–1082, doi:10.1112/plms.12341."},"year":"2020"},{"_id":"44333","user_id":"49063","department":[{"_id":"602"}],"language":[{"iso":"eng"}],"type":"journal_article","publication":"Communications in Mathematical Physics","abstract":[{"text":"This work deals with an algebro–geometric theory of solutions of the classical Yang–Baxter equation based on torsion free coherent sheaves of Lie algebras on Weierstraß cubic curves.","lang":"eng"}],"status":"public","date_updated":"2023-05-07T01:34:43Z","author":[{"first_name":"Igor","full_name":"Burban, Igor","id":"72064","last_name":"Burban"},{"first_name":"L.","full_name":"Galinat, L.","last_name":"Galinat"}],"date_created":"2023-05-02T18:50:35Z","volume":364,"title":"Torsion free sheaves on Weierstraß cubic curves and the classical Yang-Baxter equation","doi":"10.1007/s00220-018-3172-2","publication_status":"published","issue":"1","year":"2018","citation":{"mla":"Burban, Igor, and L. Galinat. “Torsion Free Sheaves on Weierstraß Cubic Curves and the Classical Yang-Baxter Equation.” Communications in Mathematical Physics, vol. 364, no. 1, 2018, pp. 123–169, doi:10.1007/s00220-018-3172-2.","short":"I. Burban, L. Galinat, Communications in Mathematical Physics 364 (2018) 123–169.","bibtex":"@article{Burban_Galinat_2018, title={Torsion free sheaves on Weierstraß cubic curves and the classical Yang-Baxter equation}, volume={364}, DOI={10.1007/s00220-018-3172-2}, number={1}, journal={Communications in Mathematical Physics}, author={Burban, Igor and Galinat, L.}, year={2018}, pages={123–169} }","apa":"Burban, I., & Galinat, L. (2018). Torsion free sheaves on Weierstraß cubic curves and the classical Yang-Baxter equation. Communications in Mathematical Physics, 364(1), 123–169. https://doi.org/10.1007/s00220-018-3172-2","chicago":"Burban, Igor, and L. Galinat. “Torsion Free Sheaves on Weierstraß Cubic Curves and the Classical Yang-Baxter Equation.” Communications in Mathematical Physics 364, no. 1 (2018): 123–169. https://doi.org/10.1007/s00220-018-3172-2.","ieee":"I. Burban and L. Galinat, “Torsion free sheaves on Weierstraß cubic curves and the classical Yang-Baxter equation,” Communications in Mathematical Physics, vol. 364, no. 1, pp. 123–169, 2018, doi: 10.1007/s00220-018-3172-2.","ama":"Burban I, Galinat L. Torsion free sheaves on Weierstraß cubic curves and the classical Yang-Baxter equation. Communications in Mathematical Physics. 2018;364(1):123–169. doi:10.1007/s00220-018-3172-2"},"intvolume":" 364","page":"123–169"},{"type":"preprint","status":"public","_id":"44538","department":[{"_id":"602"}],"user_id":"49063","language":[{"iso":"eng"}],"publication_status":"published","year":"2018","citation":{"ieee":"I. Burban and Yu. Drozd, “Non-commutative nodal curves and derived tame algebras.” 2018.","chicago":"Burban, Igor, and Yu. Drozd. “Non-Commutative Nodal Curves and Derived Tame Algebras,” 2018.","ama":"Burban I, Drozd Yu. Non-commutative nodal curves and derived tame algebras. Published online 2018.","short":"I. Burban, Yu. Drozd, (2018).","bibtex":"@article{Burban_Drozd_2018, title={Non-commutative nodal curves and derived tame algebras}, author={Burban, Igor and Drozd, Yu.}, year={2018} }","mla":"Burban, Igor, and Yu. Drozd. Non-Commutative Nodal Curves and Derived Tame Algebras. 2018.","apa":"Burban, I., & Drozd, Yu. (2018). Non-commutative nodal curves and derived tame algebras."},"date_updated":"2023-05-07T01:36:42Z","date_created":"2023-05-07T00:56:31Z","author":[{"id":"72064","full_name":"Burban, Igor","last_name":"Burban","first_name":"Igor"},{"first_name":"Yu.","full_name":"Drozd, Yu.","last_name":"Drozd"}],"title":"Non-commutative nodal curves and derived tame algebras","main_file_link":[{"url":"https://doi.org/10.48550/arXiv.1805.05174"}]},{"language":[{"iso":"eng"}],"article_number":"1850064-46 pp","department":[{"_id":"602"}],"user_id":"49063","_id":"44332","status":"public","publication":"International Journal of Mathematics","type":"journal_article","title":"Fourier-Mukai transform on Weierstraß cubics and commuting differential operators","volume":29,"date_created":"2023-05-02T18:49:12Z","author":[{"first_name":"Igor","full_name":"Burban, Igor","id":"72064","last_name":"Burban"},{"first_name":"A.","last_name":"Zheglov","full_name":"Zheglov, A."}],"date_updated":"2023-05-07T01:41:27Z","intvolume":" 29","citation":{"chicago":"Burban, Igor, and A. Zheglov. “Fourier-Mukai Transform on Weierstraß Cubics and Commuting Differential Operators.” International Journal of Mathematics 29, no. 10 (2018).","ieee":"I. Burban and A. Zheglov, “Fourier-Mukai transform on Weierstraß cubics and commuting differential operators,” International Journal of Mathematics, vol. 29, no. 10, Art. no. 1850064–46 pp, 2018.","ama":"Burban I, Zheglov A. Fourier-Mukai transform on Weierstraß cubics and commuting differential operators. International Journal of Mathematics. 2018;29(10).","apa":"Burban, I., & Zheglov, A. (2018). Fourier-Mukai transform on Weierstraß cubics and commuting differential operators. International Journal of Mathematics, 29(10), Article 1850064- 46 pp.","bibtex":"@article{Burban_Zheglov_2018, title={Fourier-Mukai transform on Weierstraß cubics and commuting differential operators}, volume={29}, number={101850064–46 pp}, journal={International Journal of Mathematics}, author={Burban, Igor and Zheglov, A.}, year={2018} }","short":"I. Burban, A. Zheglov, International Journal of Mathematics 29 (2018).","mla":"Burban, Igor, and A. Zheglov. “Fourier-Mukai Transform on Weierstraß Cubics and Commuting Differential Operators.” International Journal of Mathematics, vol. 29, no. 10, 1850064-46 pp, 2018."},"year":"2018","issue":"10","publication_status":"published"},{"status":"public","type":"book","extern":"1","language":[{"iso":"eng"}],"_id":"44337","series_title":"Memoirs of the American Mathematical Society","user_id":"49063","department":[{"_id":"602"}],"year":"2017","citation":{"ama":"Burban I, Drozd Yu. Maximal Cohen-Macaulay Modules over Non-Isolated Surface Singularities and Matrix Problems. Vol 248. 1178th ed.; 2017. doi:10.1090/memo/1178","ieee":"I. Burban and Yu. Drozd, Maximal Cohen-Macaulay modules over non-isolated surface singularities and matrix problems, 1178th ed., vol. 248. 2017.","chicago":"Burban, Igor, and Yu. Drozd. Maximal Cohen-Macaulay Modules over Non-Isolated Surface Singularities and Matrix Problems. 1178th ed. Vol. 248. Memoirs of the American Mathematical Society, 2017. https://doi.org/10.1090/memo/1178.","apa":"Burban, I., & Drozd, Yu. (2017). Maximal Cohen-Macaulay modules over non-isolated surface singularities and matrix problems (1178th ed., Vol. 248). https://doi.org/10.1090/memo/1178","bibtex":"@book{Burban_Drozd_2017, edition={1178}, series={Memoirs of the American Mathematical Society}, title={Maximal Cohen-Macaulay modules over non-isolated surface singularities and matrix problems}, volume={248}, DOI={10.1090/memo/1178}, author={Burban, Igor and Drozd, Yu.}, year={2017}, collection={Memoirs of the American Mathematical Society} }","mla":"Burban, Igor, and Yu. Drozd. Maximal Cohen-Macaulay Modules over Non-Isolated Surface Singularities and Matrix Problems. 1178th ed., vol. 248, 2017, doi:10.1090/memo/1178.","short":"I. Burban, Yu. Drozd, Maximal Cohen-Macaulay Modules over Non-Isolated Surface Singularities and Matrix Problems, 1178th ed., 2017."},"intvolume":" 248","publication_status":"published","publication_identifier":{"isbn":["978-1-4704-2537-1"]},"edition":"1178","title":"Maximal Cohen-Macaulay modules over non-isolated surface singularities and matrix problems","doi":"10.1090/memo/1178","date_updated":"2023-05-07T01:33:37Z","author":[{"first_name":"Igor","last_name":"Burban","full_name":"Burban, Igor","id":"72064"},{"last_name":"Drozd","full_name":"Drozd, Yu.","first_name":"Yu."}],"date_created":"2023-05-02T18:59:05Z","volume":248},{"main_file_link":[{"url":"https://doi.org/10.48550/arXiv.1706.08358"}],"title":"On the derived categories of gentle and skew-gentle algebras: homological algebra and matrix problems","author":[{"id":"72064","full_name":"Burban, Igor","last_name":"Burban","first_name":"Igor"},{"full_name":"Drozd, Yu.","last_name":"Drozd","first_name":"Yu."}],"date_created":"2023-05-07T00:57:34Z","date_updated":"2023-05-07T01:36:54Z","citation":{"apa":"Burban, I., & Drozd, Yu. (2017). On the derived categories of gentle and skew-gentle algebras: homological algebra and matrix problems.","short":"I. Burban, Yu. Drozd, (2017).","bibtex":"@article{Burban_Drozd_2017, title={On the derived categories of gentle and skew-gentle algebras: homological algebra and matrix problems}, author={Burban, Igor and Drozd, Yu.}, year={2017} }","mla":"Burban, Igor, and Yu. Drozd. On the Derived Categories of Gentle and Skew-Gentle Algebras: Homological Algebra and Matrix Problems. 2017.","ama":"Burban I, Drozd Yu. On the derived categories of gentle and skew-gentle algebras: homological algebra and matrix problems. Published online 2017.","chicago":"Burban, Igor, and Yu. Drozd. “On the Derived Categories of Gentle and Skew-Gentle Algebras: Homological Algebra and Matrix Problems,” 2017.","ieee":"I. Burban and Yu. Drozd, “On the derived categories of gentle and skew-gentle algebras: homological algebra and matrix problems.” 2017."},"year":"2017","publication_status":"published","extern":"1","language":[{"iso":"eng"}],"user_id":"49063","department":[{"_id":"602"}],"_id":"44539","status":"public","type":"preprint"},{"year":"2017","citation":{"ieee":"I. Burban and L. Galinat, “Simple vector bundles on a nodal Weierstraß cubic and quasi-trigonometric solutions of CYBE,” Journal of Physics A: Mathematical and Theoretical, vol. 50, Art. no. 454002, 2017.","chicago":"Burban, Igor, and L. Galinat. “Simple Vector Bundles on a Nodal Weierstraß Cubic and Quasi-Trigonometric Solutions of CYBE.” Journal of Physics A: Mathematical and Theoretical 50 (2017).","ama":"Burban I, Galinat L. Simple vector bundles on a nodal Weierstraß cubic and quasi-trigonometric solutions of CYBE. Journal of Physics A: Mathematical and Theoretical. 2017;50.","short":"I. Burban, L. Galinat, Journal of Physics A: Mathematical and Theoretical 50 (2017).","bibtex":"@article{Burban_Galinat_2017, title={Simple vector bundles on a nodal Weierstraß cubic and quasi-trigonometric solutions of CYBE}, volume={50}, number={454002}, journal={Journal of Physics A: Mathematical and Theoretical}, author={Burban, Igor and Galinat, L.}, year={2017} }","mla":"Burban, Igor, and L. Galinat. “Simple Vector Bundles on a Nodal Weierstraß Cubic and Quasi-Trigonometric Solutions of CYBE.” Journal of Physics A: Mathematical and Theoretical, vol. 50, 454002, 2017.","apa":"Burban, I., & Galinat, L. (2017). Simple vector bundles on a nodal Weierstraß cubic and quasi-trigonometric solutions of CYBE. 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