Generalized Harish-Chandra modules
I. B. Penkov, V. V. Serganova

Эта публикация цитируется в следующих статьяx:

1. Ivan Penkov, Crystal Hoyt, Springer Monographs in Mathematics, Classical Lie Algebras at Infinity, 2022, 125  
2. Petukhov A., “On Annihilators of Bounded (G, K)-Modules”, J. Lie Theory, 28:4 (2018), 1137–1147      
3. Tomasini G., Orsted B., “Unitary Representations of the Universal Cover of Su(1,1) and Tensor Products”, Kyoto J. Math., 54:2 (2014), 311–352          
4. Ivan Penkov, Gregg Zuckerman, Developments in Mathematics, 38, Developments and Retrospectives in Lie Theory, 2014, 331  
5. Tomasini G., “Restriction to Levi Subalgebras and Generalization of the Category O”, Ann. Inst. Fourier, 63:1 (2013), 37–88          
6. Penkov I., Serganova V., “On Bounded Generalized Harish-Chandra Modules”, Ann. Inst. Fourier, 62:2 (2012), 477–496        
7. Tomasini G., “Integrability of Weight Modules of Degree 1”, J. Lie Theory, 22:2 (2012), 523–539      
8. Gregg Zuckerman, Progress in Mathematics, 295, Highlights in Lie Algebraic Methods, 2012, 123  
9. Milev T., “Root Fernando-Kac subalgebras of finite type”, J Algebra, 336:1 (2011), 257–278        
10. Penkov I., Serganova V., “Bounded Simple (g, sl(2))-modules for rkg=2”, J Lie Theory, 20:3 (2010), 581–615      
11. Tomasini G., “A generalization of the category O of Bernstein-Gelfand-Gelfand”, C R Math Acad Sci Paris, 348:9–10 (2010), 509–512        
12. Penkov I., Serganova V., Zuckerman G., “On the existence of $(\mathfrak g,\mathfrak l)$-modules of finite type”, Duke Math. J., 125:2 (2004), 329–349        
13. Penkov I., Zuckerman G., “Generalized Harish-Chandra modules: a new direction in the structure theory of representations”, Acta Appl. Math., 81:1-3 (2004), 311–326