Publications
τ-complemented and τ-supplemented modules. Algebra Discrete Math.. 2006:1-16.Edit
When δ-semiperfect rings are semiperfect. Turkish J. Math.. 2010;34:317-324.Edit
When is a smash product semiprime? A partial answer. J. Algebra. 2004;275:339-355.Edit
[2008-30] When δ-semiperfect rings are semiperfect .Edit
On Topological Lattices and their Applications to Module Theory. Journal of Algebra and its Applications. 2016;15(3):1650046.Edit
On the semiprime smash product question. In: International Conference on Noncommutative Rings and their Applications. Vol Contemporary Mathematics 634. France, Lens: American Math. Soc.; 2015. Edit
On semilocal modules and rings. Comm. Algebra. 1999;27:1921-1935.Edit
Rings whose modules are weakly supplemented are perfect. Applications to certain ring extensions. Math. Scand.. 2009;105:25-30.Edit
Ring theoretical properties of affine cellular algebras. Journal of Algebra. 2017;476:494-518.Edit
A remark on a theorem of Y. Kurata. Hokkaido Math. J.. 2001;30:645-648.Edit
Regular and biregular module algebras. Arab. J. Sci. Eng. Sect. C Theme Issues. 2008;33:351-363.Edit
[2008-15] Regular and biregular module algebras .
On a recent generalization of semiperfect rings. Bull. Aust. Math. Soc.. 2008;78:317-325.Edit
Quantum groupoids acting on semiprime algebras. Adv. Math. Phys.. 2011:Art. ID 546058, 9.Edit
Prime elements in partially ordered groupoids applied to modules and Hopf algebra actions. J. Algebra Appl.. 2005;4:77-97.Edit
[2004-2] Prime elements in partially ordered groupoids applied to modules and Hopf algebra actions .
[2017-17] Panov's theorem for weak Hopf algebras .Edit
On the notion of strong irreducibility and its dual. J. Algebra Appl.. 2013;12:1350012.Edit
On the notion of `retractable modules' in the context of algebras. Palest. J. Math.. 2014;3:343-355.Edit
A note on semicentral idempotents. Communications in Algebra. 2017;45:2735-2737.Edit
A note on prime modules. Divulg. Mat.. 2000;8:31-42.Edit