Publications by M. I. Samar

  1. K.-D. V. Kovach, M. I. Samar
    Kepler problem in general relativity with Lorentz-covariant deformed Poisson brackets
    J. Phys. Stud. 26, No. 4, 4001 [6 p.] (2022)
    [abs]
  2. M. I. Samar, V. M. Tkachuk
    Regularization of δ′ potential in general case of deformed space with minimal length
    J. Phys. A: Math. Theor. 55, No. 41, 415201 [14 p.] (2022)
    [abs]
  3. M. I. Samar
    Classical dS and AdS cosmologies in the general case of deformed space with minimal length
    Visnyk Lviv Univ. Ser. Phys. 57, 33-45 (2020)
    [abs]
  4. M. I. Samar, V. M. Tkachuk
    Regularization of 1/X2 potential in general case of deformed space with minimal length
    J. Math. Phys. 61, No. 9, 092101 [10 p.] (2020)
    [abs]
  5. M. I. Samar, V. M. Tkachuk
    Kepler problem in space with deformed Lorentz-covariant Poisson brackets
    Found. Phys. 50, No. 9, 942–959 (2020)
    [abs]
  6. Kh. P. Gnatenko, M. I. Samar, V. M. Tkachuk
    Time-reversal and rotational symmetries in noncommutative phase space
    Phys. Rev. A 99, No. 1, 012114 [6 p.] (2019)
    [abs]
  7. M. I. Samar, V. M. Tkachuk
    Exact solutions for two-body problems in 1D deformed space with minimal length
    J. Math. Phys. 58, No. 12, 122108 [9 p.] (2017)
    [abs]
  8. A. M. Frydryszak, M. I. Samar, V. M. Tkachuk
    Quantifying geometric measure of entanglement by mean value of spin and spin correlations with application to physical systems
    Eur. Phys. J. D 71, No. 9, 233 [8 p.] (2017)
    [abs]
  9. M. I. Samar, V. M. Tkachuk
    One-dimensional Coulomb-like problem in general case of deformed space with minimal length
    J. Math. Phys. 57, No. 8, 082108 [12 p.] (2016)
    [abs]
  10. M. I. Samar, V. M. Tkachuk
    Exactly solvable problems in the momentum space with a minimum uncertainty in position
    J. Math. Phys. 57, No. 4, 042102 [8 p.] (2016)
    [abs]
  11. M. I. Samar
    Physical states in deformed space with minimal length
    Visnyk Lviv Univ. Ser. Phys. 50, 72-83 (2015)
    [full text]
  12. M. I. Samar
    Modified perturbation theory for hydrogen atom in space with Lorentz-covariant deformed algebra with minimal length
    J. Phys. Stud. 15, No. 1, 1007 [7 p.] (2011)
    [full text]
  13. M. I. Samar, V. M. Tkachuk
    Perturbation hydrogen-atom spectrum in a space with the Lorentz-covariant deformed algebra with minimal length
    J. Phys. Stud. 14, No. 1, 1001 [5 p.] (2010)
    [full text]