Publications
Maximal error-detecting capabilities of formal languages. J. Autom. Lang. Comb.. 2008;13:55-71.Edit
Some two-dimensional integral transformations of convolution type. Dokl. Akad. Nauk BSSR. 1990;34:396-398, 474.Edit
On lifting LE-modules. Vietnam J. Math.. 2002;30:167-176.Edit
Integral calculus on quantum exterior algebras. Int. J. Geom. Methods Mod. Phys.. 2014;11:1450026, 20.Edit
[2006-10] On the rational subset problem for groups .Edit
The spectra of lamplighter groups and Cayley machines. Geom. Dedicata. 2006;120:193-227.Edit
On the rational subset problem for groups. J. Algebra. 2007;309:622-639.Edit
The new Leibniz rules and their integral analogues. Internat. J. Math. Statist. Sci.. 1993;2:187-225 (1995).Edit
Subring depth, Frobenius extensions, and towers. Int. J. Math. Math. Sci.. 2012:Art. ID 254791, 22.
Hopf subalgebras and tensor powers of generalized permutation modules. J. Pure Appl. Algebra. 2014;218:367-380.
[2010-30] Ideal depth of QF extensions .
Odd H-depth and H-separable extensions. Cent. Eur. J. Math.. 2012;10:958-968.
Preface. Special Issue - Descriptional Complexity of Formal Languages DCFS 2013. International Journal of Fundations of Computer Science. 2015;25(7):803-805.Edit
Descriptional Complexity of Formal Systems, 15th International Workshop (DCFS 2013). Vol 8031. Jurgensen H, Reis R, editors Springer 2013.Edit
Mathematical models in cancer therapy. Biosystems. 2017;162:12-23.Edit
Finite semigroups that are minimal for not being Malcev nilpotent. J. Algebra Appl.. 2014;13:1450063, 22.Edit
A description of a class of finite semigroups that are near to being Mal\cprime cev nilpotent. J. Algebra Appl.. 2013;12:1250221, 26.Edit
The non-nilpotent graph of a semigroup. Semigroup Forum. 2012;85:37-57.Edit
Equivalence of Human Odometry by Walk and Run Is Indifferent to Self-Selected Speed. Journal of Motor Behavior. 2012;44:47-52.Edit
When weak Hopf algebras are Frobenius. Proc. Amer. Math. Soc.. 2010;138:837-845.Edit