Bódi Viktor

docens;
fizika és matematika tudományok kandidátusa
Matematika és Informatika Tanszék

ORCID:
0000-0001-5750-163X Magyar Tudományos Művek Tára Google Scholar Curriculum vitae

Kutatási területek

Csoportalgebrák, keresztezett csoportgyűrű, egységek csoportja

Publikációk

Publikációk (az utóbbi 5 évben):

Scopus, Web of Science:

  1. Bovdi V.; Horn, R.A.; Salim, M., Sergeichuk V. Symplectic spaces and pairs of symmetric and nonsingular skew-symmetric matrices under congruence. Linear Algebra Appl. 537 (2018), 84–99.
  2. Bovdi V.; Gerasimova, T.; Salim, M.; Sergeichuk V.,  Reduction of a pair of skew-symmetric matrices to its canonical form under congruence. Linear Algebra Appl. 543 (2018), 17—30.
  3. Bovdi V; Salim, M., Group algebras whose groups of normalized units have   exponent 4, Czechoslovak Math Journal, 68 (143) (2018), 141–148.
  4. Bovdi V; Salim, M.; Ursul, M., Completely simple endomorphism rings of modules, Applied General Topology, 19(2), (2018), 1–17.
  5. Bovdi V.; Salim, M., Sergeichuk V., Neighborhood radius estimation for Arnold’s miniversal of complex and p-adic matrices. Linear Algebra and Applications, 512, (2017), no 1, 97—
  6. Bovdi V.; Shchedryk, V. Commutative Bezout domains of stable range 1.5. Linear Algebra Appl. 568 (2019), 127—134.
  7. Bovdi V.; Grishkov, A.; Unitary and symmetric units of a commutative group algebra,  Edinb. Math. Soc. 62(3) (2019), 641—654.
  8. Bovdi V, Leung, Ho-Hon, Maximal commutative subalgebras of a Grassmann algebra, J. of Algebra and Its Applications, 18(7) (2019), 1—15.
  9. Victor Bovdi, O.Yu. Dashkova & Mohamed A. Salim: Subgroups of a finitary linear group. In: Ricerche di Matematica 68 (2), 2019, pp. 803–809.
  10. Bovdi, V.; Breuer, Th.; Maróti, A.; Finite simple groups with short Galois orbits on conjugacy classes. J. Algebra 544 (2020), 151—169.
  11. Bovdi V; Klymchuk, T.;  Rybalkina, T.;  Salim, M.;  Sergeichuk,V.; Operators on positive semidefinite inner product spaces, Linear Algebra Appl. 596 (2020), 82—105.
  12. Bovdi V., Zubkov, A.; Rational semi-invariants of super representations of quivers. J. of Algebra and Computation, 30(4) (2020), p.883—902.
  13. Bovdi V, Group algebra whose unit group is locally nilpotent, J. Austral Math. Soc., 109 (2020), 17—23.
  14. Artemovych, O., Bovdi, V., Salim, M.; Derivation on group rings, Acta Math. Szeged, 86 (2020), 51—72.
  15. Balogh Zs., Bovdi, V.; The Isomorphism Problem of Unitary Subgroups of Modular Group Algebras, Math. Debrecen, 97/1-2 (2020), 27—39.
  16. Artemovych, O. D.; Ballester-Bolinches, A.; Bovdi, V. A.; et al.; Leonid A . Kurdachenko (dedicated to the 70th birthday). Algebra Discrete Math. 29 (1) (2020), 1—1.
  17. Artemovich, O. D.; Ballester-Bolinches, A.; Bovdi, V. A.; et al.; Igor Ya. Subbotin (dedicated to the 70th birthday). Algebra Discrete Math. 29(2) (2020), 1—1.
  18. Bovdi, V. A.; Vasilev, A. F.; Grigorchuk, R. I.; et al.; For Orest Dem’yanovich Artemovich—60 years. (Ukrainian) Carpathian Math. Publ. 12(2) (2020), 522—523.
  19. Bovdi, V.; Kurdachenko, L.A.; Some ranks of modules over group rings. Comm. in Algebra. 49(3) (2021), 1225— 1239.
  20. Bovdi V.; Shchedryk, V.; A generating solution of a linear equation and structure of elements of the Zelisko group I, Linear Algebra Appl. 625 (2021), 55—67.
  21. Bovdi V Zabavsky, B.; Reduction of matrices over simple Ore domains, Linear Multilinear Algebra 70(4), (2022), 642—649.
  22. Bovdi V.; Kurdachenko, L.A.; Modules over some group rings having d-generator property, Ricerche di Matematica, 71(1), (2022), 135— 145.
  23. Bovdi V.; Mesablishvili, B.; Descent cohomology and bicrossed product Algebras and Repr. Theory, (2022), 1—20. DOI:10.1007/s10468-022-10139-0
  24. Bovdi V.; Maróti, A.; Partial augmentations of a unit in integral group rings, J. of Algebra and Its Appl., (2022), 1—6.
  25. Bovdi V.; Diene, A.; Popovych, R.; Elements of high order in finite fields specified by binomials,  Carpathian Math. Publ., 14(1), (2022), 238—241.
  26. Artemovych, O., Bovdi,; Torsion subgroups, solvability and the Engel condition in associative rings, Rev. R. Acad. Cienc. Exactas Fís. Nat. Ser. A Mat. RACSAM 116 (3), (2022), Paper No. 122, 21 pp.
  27. Bovdi, V.; Shchedryk, V. A generating solution of a linear equation and structure of elements of the Zelisko group II, Quaest. Math.,  (2022), 1—15.
  28. Bovdi V Zabavsky, B.; Reduction of matrices over simple Ore domains, Linear Multilinear Algebra 70(4), (2022), 642—649.
  29. Bovdi V.; Kurdachenko, L.A.; Modules over some group rings having d-generator property, Ricerche di Matematica, 71(1), (2022), 135— 145.
  30. Bovdi V.; Mesablishvili, B.; Descent cohomology and bicrossed product Algebras and Repr. Theory, (2022), 1—20. DOI:10.1007/s10468-022-10139-0
  31. Bovdi V.; Maróti, A.; Partial augmentations of a unit in integral group rings, J. of Algebra and Its Appl., (2022), 1—6.
  32. Bovdi V.; Diene, A.; Popovych, R.; Elements of high order in finite fields specified by binomials,  Carpathian Math. Publ., 14(1), (2022), 238—241.
  33. Artemovych, O., Bovdi, V.; Torsion subgroups, solvability and the Engel condition in associative rings, Rev. R. Acad. Cienc. Exactas Fís. Nat. Ser. A Mat. RACSAM 116 (3), (2022), Paper No. 122, 21 pp. Bovdi, V.; Shchedryk, V. A generating solution of a linear equation   and structure of elements of the Zelisko group II, Quaest. Math.,  (2022), 1—15.

Külföldi országokban tudományos folyóiratokban megjelent publikciók, amelyek  a Gazdasági Együttműködési és Fejlesztési Szervezet (OECD) tagjai:

  1. Bovdi V.; Horn, R.A.; Salim, M., Sergeichuk V. Symplectic spaces and pairs of symmetric and nonsingular skew-symmetric matrices under congruence. Linear Algebra Appl. 537 (2018), 84–99.
  2. Bovdi V.; Gerasimova, T.; Salim, M.; Sergeichuk V.,  Reduction of a pair of skew-symmetric matrices to its canonical form under congruence. Linear Algebra Appl. 543 (2018), 17—30.
  3. Bovdi V; Salim, M., Group algebras whose groups of normalized units have   exponent 4, Czechoslovak Math Journal, 68 (143) (2018), 141–148.
  4. Bovdi V; Salim, M.; Ursul, M., Completely simple endomorphism rings of modules, Applied General Topology, 19(2), (2018), 1–17.
  5. Bovdi V.; Salim, M., Sergeichuk V., Neighborhood radius estimation for Arnold’s miniversal of complex and p-adic matrices. Linear Algebra and Applications, 512, (2017), no 1, 97—
  6. Bovdi V.; Shchedryk, V. Commutative Bezout domains of stable range 1.5. Linear Algebra Appl. 568 (2019), 127—134.
  7. Bovdi V.; Grishkov, A.; Unitary and symmetric units of a commutative group algebra,  Edinb. Math. Soc. 62(3) (2019), 641—654.
  8. Bovdi V, Leung, Ho-Hon, Maximal commutative subalgebras of a Grassmann algebra, J. of Algebra and Its Applications, 18(7) (2019), 1—15.
  9. Victor Bovdi, O.Yu. Dashkova & Mohamed A. Salim: Subgroups of a finitary linear group. In: Ricerche di Matematica 68 (2), 2019, pp. 803–809.
  10. Bovdi, V.; Breuer, Th.; Maróti, A.; Finite simple groups with short Galois orbits on conjugacy classes. J. Algebra 544 (2020), 151—169.
  11. Bovdi V; Klymchuk, T.;  Rybalkina, T.;  Salim, M.;  Sergeichuk,V.; Operators on positive semidefinite inner product spaces, Linear Algebra Appl. 596 (2020), 82—105.
  12. Bovdi V., Zubkov, A.; Rational semi-invariants of super representations of quivers. J. of Algebra and Computation, 30(4) (2020), p.883—902.
  13. Bovdi V, Group algebra whose unit group is locally nilpotent, J. Austral Math. Soc., 109 (2020), 17—23.
  14. Artemovych, O., Bovdi, V., Salim, M.; Derivation on group rings, Acta Math. Szeged, 86 (2020), 51—72.
  15. Balogh Zs., Bovdi, V.; The Isomorphism Problem of Unitary Subgroups of Modular Group Algebras, Math. Debrecen, 97/1-2 (2020), 27—39.
  16. Artemovych, O. D.; Ballester-Bolinches, A.; Bovdi, V. A.; et al.; Leonid A . Kurdachenko (dedicated to the 70th birthday). Algebra Discrete Math. 29 (1) (2020), 1—1.
  17. Artemovich, O. D.; Ballester-Bolinches, A.; Bovdi, V. A.; et al.; Igor Ya. Subbotin (dedicated to the 70th birthday). Algebra Discrete Math. 29(2) (2020), 1—1.
  18. Bovdi, V.; Kurdachenko, L.A.; Some ranks of modules over group rings. Comm. in Algebra. 49(3) (2021), 1225— 1239.
  19. Bovdi V.; Shchedryk, V.; A generating solution of a linear equation and structure of elements of the Zelisko group I, Linear Algebra Appl. 625 (2021), 55—67.
  20. Bovdi V Zabavsky, B.; Reduction of matrices over simple Ore domains, Linear Multilinear Algebra 70(4), (2022), 642—649.
  21. Bovdi V.; Kurdachenko, L.A.; Modules over some group rings having d-generator property, Ricerche di Matematica, 71(1), (2022), 135— 145.
  22. Bovdi V.; Mesablishvili, B.; Descent cohomology and bicrossed product Algebras and Repr. Theory, (2022), 1—20. DOI:10.1007/s10468-022-10139-0
  23. Bovdi V.; Maróti, A.; Partial augmentations of a unit in integral group rings, J. of Algebra and Its Appl., (2022), 1—6.
  24. Artemovych, O., Bovdi,; Torsion subgroups, solvability and the Engel condition in associative rings, Rev. R. Acad. Cienc. Exactas Fís. Nat. Ser. A Mat. RACSAM 116 (3), (2022), Paper No. 122, 21 pp. Bovdi, V.; Shchedryk, V. A generating solution of a linear equation   and structure of elements of the Zelisko group II, Quaest. Math.,  (2022), 1—15.

Általános információk

Általános információ az oktatóról:

1989 Ungvári Nemzeti Egyetem, Matematika szak
1998 Ungvári Nemzeti Egyetem, Doktori Iskola
1992 PhD fokozat, Kijevi Egyetem

Értekezés témája: Keresztezett csoportgyűrű egységeinek csoportja

Szakmai szövetségekben való részvétel:

A Magyar Tudományos Akadémia köztestületének külső tagja.

Szakmai és egyéb továbbképzések (az utóbbi 5 évben):

Dragomanov Nemzeti Pedagógiai Egyetemen való továbbképzés (Kijev, Ukrajna), „”Innováció a matematikai tudományágak oktatásában” – 108 óra.”, 2018.11.09.

Szakmai tapasztalat:

Szakterületen szerzett szakmai tapasztalat – több mint 30 év.