Position:
Lecturer
Department:
Department of Mathematics (DM)
Room:
NB 630
eMail:
Phone:
+421 259 325 332
Research activities:
Ordered algebraic systems
Availability:

Publications

Book

  1. M. Jasem – A. Kolesárová: Mathematics II, A Collection of Problems (in Slovak), Nakladateľstvo STU, Radlinského 9, 812 37 Bratislava, 2012.
  2. M. JasemĽ. Horanská: Mathematics I, A Collection of Problems (in Slovak), STU v Bratislave, Radlinského 9, 812 37 Bratislava., 2009.

Chapter or pages in book

  1. M. Jasem: On extension of congruences to isometries in partially ordered groups, In ZAMAT 2014, Proceedings of Applied Mathematics and Informatics, Editor(s): A. Kolesárová, M. Nehéz, pp. 65–70, 2014.

Article in journal

  1. M. Jasem: On weak isometries in directed groups. Mathematica Slovaca, no. 5, vol. 69, pp. 989–998, 2019.
  2. M. Jasem: A Cauchy completion of dually residuated lattice ordered semigroups. Journal of Applied Mathematics, no. 3, vol. 5, pp. 15–23, 2012.
  3. M. Jasem: On Isometries in GMV-Algebras. Mathematica Slovaca, no. 5, vol. 61, pp. 827–833, 2011.
  4. M. Jasem: Relatively uniform convergence in dually residuated lattice ordered semigroups. Journal of Applied Mathematics, no. 2, vol. 4, pp. 77–83, 2011.
  5. M. Jasem: Isometries and direct decompositions of pseudo MV-algebras. Mathematica Slovaca, vol. 57, pp. 107–118, 2007.
  6. M. Jasem: On ideals of lattice ordered monoids. Mathematica Bohemica, no. 132, pp. 369–387, 2007.
  7. M. Jasem: On Intrinsic Quasimetrics Preserving Maps on non-abelian Partially Ordered Groups. Mathematica Slovaca, vol. 54, pp. 225–228, 2004.
  8. M. Jasem: On Lattice-ordered Monoids. Discussiones Mathematicae, General Algebra and Applications, no. 2, vol. 23, pp. 101–114, 2003.
  9. M. Jasem: Intrinsic metric preserving maps on partially ordered groups. Algebra Universalis, no. 1, vol. 36, pp. 135–140, 1996.
  10. M. Jasem: Isometries in non-abelian multilattice groups. Mathematica Slovaca, no. 5, vol. 46, pp. 491–496, 1996.
  11. M. Jasem: Weak isometries and direct decompositions of partially ordered groups. Tatra Mountains Mathematical Publications, vol. 5, pp. 131–142, 1995.
  12. M. Jasem: Weak isometries in directed groups. Mathematica Slovaca, vol. 44, pp. 39–43, 1994.
  13. M. Jasem: On isometries in partially ordered groups. Mathematica Slovaca, no. 1, vol. 43, pp. 21–29, 1993.
  14. M. Jasem: Weak isometries and direct decompositions of dually residuated lattice ordered semigroups. Mathematica Slovaca, no. 2, vol. 43, pp. 119–136, 1993.
  15. M. Jasem: On weak isometries in multilattice groups. Mathematica Slovaca, no. 4, vol. 40, pp. 337–340, 1990.
  16. M. Jasem: On dilations and contractions in Riesz groups. Časopis pro pěstování matematiky, no. 2, vol. 114, pp. 134–141, 1990.
  17. M. Jasem: Pairs of partially ordered groups with the same convex subgroups. Mathematica Slovaca, no. 2, vol. 37, pp. 173–189, 1987.
  18. M. Jasem: Isometries in Riesz groups. Czechoslovak Mathematical Journal, vol. 36, pp. 35–43, 1986.

Article in conference proceedings

  1. M. Jasem: On congruences and orthogonal elements in directed groups. Editor(s): Miroslav Hrubý, Edita Kolářová, In Mathematics, Information Technologies And Applied Sciences, University of Defence, Brno, Šumavská 4, Czech Republic, pp. 13–13, 2023.
  2. M. Jasem: On properties of weak isometries in directed groups. Editor(s): Miroslav Hrubý, Pavlína Račková, In Matematika, informační technologie a aplikované vedy (MITAV 2018), Univerzita obrany v Brne, pp. 38–38, 2018.
  3. M. Jasem: Some properties of weak isometries in directed groups. In Mathematics, Information Technologies and Applied Sciences 2018, University of Defence, Brno, 2018, pp. 79–88, 2018.
  4. M. Jasem: On weak isometries in abelian directed groups. Editor(s): O. Šedivý, V. Švecová, D. Vallo, K. Vidermanová, In ACTA MATHEMATICA 17, UKF v Nitre, vol. 17, pp. 63–68, 2014.
  5. M. Jasem: On weak isometries and congruences in abelian directed groups. In Proceedings of International Conference Presentation of Mathematics'14, Technická univerzita v Liberci, Studentská 2, Liberec, pp. 55–64, 2014.
  6. M. Jasem: A Cauchy completion of dually residuated lattice ordered semigroups. Editor(s): M. Kováčová, In Aplimat 2012, Faculty of Mechanical Engineering STU, vol. 11, pp. 55–62, 2012.
  7. M. Jasem: On Convergence with a Fixed Regulator in Riesz Groups. Editor(s): O. Šedivý, D. Vallo, K. Vidermanová, In ACTA MATHEMATICA 14, UKF v NITRE, vol. 14, pp. 95–100, 2011.
  8. M. Jasem: Relatively Uniform Convergence in Dually Residuated Lattice Ordered Semigroups. Editor(s): M. Kováčová, In Aplimat 2011, Faculty of Mechanical Engineering STU, vol. 10, pp. 129–135, 2011.
  9. M. Jasem: On convergence with a fixed regulator in dually residuated lattice ordered semigroups. Editor(s): D. Andrejsová, J. Hozman, In Proceedings of International Conference Presentation of Mathematics'11, Technická univerzita v Liberci, pp. 69–77, 2011.
  10. M. Jasem: Relatively Uniform Convergence in Riesz Groups. Editor(s): M. Kováčová, In Aplimat 2010, STU, vol. 9, pp. 57–61, 2010.
  11. M. Jasem: A review of non-commutative mv-algebras. Editor(s): Fikar, M., Kolesárová, A., Bakošová, M., In Proceedings IAM 2007 - Workshop on Informatics, Automation and Mathematics, STU Press, pp. 53–57, 2007.

Article in collection

  1. M. Jasem: Weak relatively uniform convergence in dually residuated lattice ordered semigroups. In Contributions to general algebra, Verlag Johannes Heyn, Klagenfurt, vol. 20, pp. 39–49, 2011.
  2. M. Jasem: Weak relatively uniform convergence in Riesz groups. In Contributions to General Algebra 19, Verlag Johannes Heyn, Klagenfurt, pp. 127–138, 2010.
  3. M. Jasem: On Elements of Lattice Ordered Monoids. In Cotributions to General Algebra, Verlag Johannes Heyn, Klagenfurt, vol. 18, pp. 87–95, 2007.
  4. M. Jasem: On polars and Direct Decompositions of Lattice Ordered Monoids. In Contibutions to General Algebra, Verlag Johannes Heyn, Klagenfurt, vol. 16, pp. 115–132, 2005.

Phd's thesis

  1. M. Jasem: On mappings preserving intrinsic metrics or quasimetrics in partially ordered algebraic systems. SvF STU v Bratislave, Radlinského 11, 813 68 Bratislava, 2013.
Facebook / Youtube

Facebook / Youtube

RSS