Locally Compact Quantum Groups. A von Neumann Algebra Approach
Alfons Van Daele

Эта публикация цитируется в следующих статьяx:

1. Byung-Jay Kahng, “Multiplicative partial isometries, the manageability, and C⁎-algebraic quantum groupoids”, Journal of Mathematical Analysis and Applications, 2026, 130535  
2. Jacek Krajczok, Piotr M. Sołtan, “On certain invariants of compact quantum groups”, Journal of Functional Analysis, 291:1 (2026), 111468  
3. Jacek Krajczok, Adam Skalski, “Separation properties for positive-definite functions on locally compact quantum groups and for associated von Neumann algebras”, Sel. Math. New Ser., 31:3 (2025)  
4. Daws M., “One-Parameter Isometry Groups and Inclusions Between Operator Algebras”, N. Y. J. Math., 27 (2021), 164–204    
5. Skalski A., Viselter A., “Generating Functionals For Locally Compact Quantum Groups”, Int. Math. Res. Notices, 2021:14 (2021), 10981–11009      
6. Krajczok J., “Type i Locally Compact Quantum Groups: Integral Characters and Coamenability”, Diss. Math., 561 (2021), 4–151    
7. M. Alaghmandan, J. Crann, M. Neufang, “Mapping ideals of quantum group multipliers”, Adv. Math., 374 (2020), 107353        
8. A. M. Gonzalez-Perez, “A few observations on weaver's quantum relations”, J. Operat. Theor., 83:1 (2020), 197–228        
9. A. Skalski, A. Viselter, “Convolution semigroups on locally compact quantum groups and noncommutative Dirichlet forms”, J. Math. Pures Appl., 124 (2019), 59–105          
10. B.-J. Kahng, A. Van Daele, “A class of c-algebraic locally compact quantum groupoids part ii. Main theory”, Adv. Math., 354 (2019), 106761        
11. B.-J. Kahng, A. Van Daele, “A class of $C^*$-algebraic locally compact quantum groupoids part I. Motivation and definition”, Int. J. Math., 29:4 (2018), 1850029          
12. A. Medghalchi, A. Mollakhalili, “Compact and weakly compact multipliers of locally compact quantum groups”, Bull. Iran Math. Soc., 44:1 (2018), 101–136        
13. K. De Commer, “I-factorial quantum torsors and Heisenberg algebras of quantized universal enveloping type”, J. Funct. Anal., 274:1 (2018), 152–221          
14. B.-J. Kahng, A. Van Daele, “Separability idempotents in $C^*$-algebras”, J. Noncommutative Geom., 12:3 (2018), 996–1039        
15. J. Crann, “On hereditary properties of quantum group amenability”, Proc. Amer. Math. Soc., 145:2 (2017), 627–635          
16. J. Crann, “Amenability and covariant injectivity of locally compact quantum groups II”, Can. J. Math.-J. Can. Math., 69:5 (2017), 1064–1086          
17. Matthew Daws, Adam Skalski, Ami Viselter, “Around Property (T) for Quantum Groups”, Commun. Math. Phys., 353:1 (2017), 69  
18. Kochubei A.N., “Non-Archimedean Duality: Algebras, Groups, and Multipliers”, Algebr. Represent. Theory, 19:5 (2016), 1081–1108            
19. Runde V., Viselter A., “On Positive Definiteness over Locally Compact Quantum Groups”, Can. J. Math.-J. Can. Math., 68:5 (2016), 1067–1095