basheyeva_ao@enu.kz
Master (scientific-pedagogical):
2018:- - Axiomatic Set Theory (AST 5315)
- - Fundamentals of geometry (FG 5314)
- - Fundamentals of Model Theory (FMT 5328)
- - Differential and integral calculus in a school course to mathematics (DICSCM 6313)
- - Modern tools and methods of teaching mathematics (MTMTM 6314)
- - Minimal structures (MS 6314)
- - The methods for solving plotting problems (MSPP 5314)
- - General questions of axiomatics in geometry
- - Theoretical foundations of teaching mathematics (TFTM 5304)
- - Algebraic systems
- - Some questions of Universal algebra
- - Fundamentals of concept analysis
- - Fundamental questions of discrete mathematics
Doctor PhD:
2020:- - Noncommutative rings (NA 7203)
- - Fundamentals of varieties and quasi- varieties
Bachelor:
2014:- - Algebra and geometry (AG 1204)
- - Discrete mathematics (DM 3211)
- - Discrete mathematics (DM 3247)
- - Mathematical logic and theory of algorithms (MLTA 3241)
- - Algorithms on graphs (GA 3242)
- - Applications of the Theory of Nambe in Schools Mathematics (PTChShM 3218)
- - Solving of Olympiad tasrs in Mathematics (ROZM 4320)
- - Discrete mathematics and theory of graphs (DMTG2211)
- - Applied theory of fuzzy sets (BZhKT 3244)
- - Graph theory (GT 3245)
- - Algebra and geometrics (AG 2206)
- - Discrete Mathematics (DM 2205)
- - Analytic geometry and linear algebra* (AGLA 1201)
- - Discrete mathematics (DM 2302)
- - Algebra and analytical geometry (AlgAG 1202)
- - Management in education (ME 2204)
- - Criteria-based assessment technology (CbAT 2208)
- - Analytical geometry and discrete mathematics* (AGiDM 1207)
- - Higher algebra (HA 1203)
- - Applied algebra and geometry (AAG2303)
- - Modern fundamentals of school mathematics (MFSHM 2209)
- - Theoretical basics of school mathematics of 9-11 classes (TBSchM 3306)
- - Tensor analysis and mathematical logic (TAML 3225)
- - Discrete mathematics and mathematical logic (DMML 2303)
- - Inclusive education (IE 3206)
- - Theoretical basics of school mathematics of 5-8 classes (TBSChM 3302)
- - Mathematical logic and theory of algorithms (MLTA 3201)
- - Mathematical Logic and Discrete Mathematics (MLDM 4305)
- - Methods of teaching of mathematics (MTM 3301)
- - Discrete Mathematics (DM 2203)
- - Methods of teaching of mathematics (MTM 2301)
- - Organization of project activities in mathematics (OPAM 2209)
- - Mathematical Basics of Information Security (MBIS 3308)
- - Algebra (Alg 1203)
- - Elementary mathematics (EM 1212)
- - Methodology of solving problems for building geometric shapes
- - Analytic Geometry (AG1301)
- - Cryptographic methods of information protection (CMIP 4206)
- - Analytic geometry (AG 1203)
- - Elementary Mathematics (EM 1201)
- - Methods of teaching of mathematics (MTM 1302)
- - Algebra (LA 1201)
- - Mathematical logic and theory of algorithms
- - Methods of Teaching Children with SEN in an Inclusive Education (MTChSERIE 2223)
- - Discrete mathematics and mathematical logic (DMML 2210)
- - Discrette mathematics
- - Preparation of students for national and international programs for the assessment of academic achievements
- - Discrete Mathematics
- - Theory of the graphs (TG 4315)
- - Discrete mathematics (DM2204)
- - Discrete mathematics
- - Graph theory and its applications
1. Bipartite Digraphs with Modular Concept Lattices of height 2.
Bulletin of the Karaganda University Mathematics Series. 2025
2. Finite Lattices Generating Not Finitely–Based and Nonstandard Quasivarieties.
Journal of Mathematics. 2025
3. The Quasivariety. II: A Duality Result.
Siberian Mathematical Journal. 2024
4. Note on quasivarieties generated by finite pointed abelian groups.
Open Mathematics. 2024
5. Some non-standard quasivarieties of lattices.
Bulletin of the Karaganda University Mathematics Series. 2023
6. On quasi-identities of finite modular lattices. II.
Bulletin of the Karaganda University Mathematics Series. 2023
7. Identities and Quasi-Identities of Pointed Algebras.
Siberian Mathematical Journal. 2022
8. THE QUASIVARIETY SP(L6). I. AN EQUATIONAL BASIS.
Siberian Electronic Mathematical Reports. 2022
9. Properties not retained by pointed enrichments of finite lattices.
Algebra Universalis. 2020
10. Quasiequational Bases of Cantor Algebras.
Siberian Mathematical Journal. 2018
11. On ω-independent bases for quasi-identities.
Siberian Electronic Mathematical Reports. 2017
12. Lattices of subclasses. III.
Siberian Electronic Mathematical Reports. 2017
13. P-completions of lattices and its applications to formal concept analyses.
International Journal of Mathematical Models and Methods in Applied Sciences. 2014
