SCLAS References
 
From MathSciNet (=Mathematical Reviews)
 
  • Some irreducible components of the variety of complex (n+1)-dimensional Leibniz algebras.
    Khudoyberdiyev, A. Kh.; Ladra, M.; Masutova, K. K.; Omirov, B. A.; J. Geom. Phys. 121 (2017), 228-246. (here)
  • Conjugacy and Other Results in Leibniz Algebras.
    White, Ashley Walls; Thesis (Ph.D.)-North Carolina State University. 2017. 42 pp. (here)
  • Generalized derivations of Hom-Leibniz algebras. (Chinese)
    Zhou, Jia; Zhao, Xin; Zhang, Yu; J. Jilin Univ. Sci. 55 (2017), no. 2, 195-200. (here)
  • Derivations of a subclass of filiform Leibniz algebras
    AL-Nashri, AL-hossain Ahmed; Punjab Univ. J. Math. (Lahore) 49 (2017), no. 1, 85-102 (here)
  • Solvable Leibniz algebras with naturally graded non-Lie p-filiform nilradicals.
    Adashev, J. Q.; Ladra, M.; Omirov, B. A.; Comm. Algebra 45 (2017), no. 10, 4329-4347. (here)
  • More on crossed modules in Lie, Leibniz, associative and diassociative algebras
    Casas, J. M.; Casado, R. F.; Khmaladze, E.; Ladra, M.; J. Algebra Appl. 16 (2017), no. 6, 1750107, 17 pp. (here)
  • On some "minimal'' Leibniz algebras.
    Chupordia, V. A.; Kurdachenko, L. A.; Subbotin, I. Ya.; J. Algebra Appl. 16 (2017), no. 5, 1750082, 16 pp. (here)
  • Central extensions of null-filiform and naturally graded filiform non-Lie Leibniz algebras.
    Adashev, J. K.; Camacho, L. M.; Omirov, B. A.; J. Algebra 479 (2017), 461-486. (here)
  • Split 3-Leibniz algebras.
    Calderon Martin, Antonio J.; Sanchez-Ortega, Juana; J. Geom. Phys. 116 (2017), 204-215. (here)
  • Leibniz algebras admitting a multiplicative basis.
    Calderon Martin, Antonio J.; Bull. Malays. Math. Sci. Soc. 40 (2017), no. 2, 679-695. (here)
  • Leibniz algebras whose semisimple part is related to sl2.
    Camacho, L. M.; Gomez-Vidal, S.; Omirov, B. A.; Karimjanov, I. A.; Bull. Malays. Math. Sci. Soc. 40 (2017), no. 2, 599-615. (here)
  • Operads and triangulation of Loday's diagram on Leibniz algebras.
    Gnedbaye, Allahtan Victor; Afr. Mat. 28 (2017), no. 1-2, 109-118. (here)
  • The Leibniz algebras whose subalgebras are ideals.
    Kurdachenko, Leonid A.; Semko, Nikolai N.; Subbotin, Igor Ya.; Open Math. 15 (2017), 92-100. (here)
  • Leibniz algebras associated with representations of the Diamond Lie algebra.
    Uguz, Selman; Karimjanov, Iqbol A.; Omirov, Bakhrom A.; Algebr. Represent. Theory 20 (2017), no. 1, 175-195. (here)
  • On Lie-central extensions of Leibniz algebras.
    Casas, J. M.; Khmaladze, E.; Rev. R. Acad. Cienc. Exactas Fis. Nat. Ser. A Math. RACSAM 111 (2017), no. 1, 39-56. (here)
  • Right and left solvable extensions of an associative Leibniz algebra.
    Shabanskaya, A.; Comm. Algebra 45 (2017), no. 6, 2633-2661. (here)
  • On derivations of semisimple Leibniz algebras.
    Rakhimov, I. S.; Masutova, K. K.; Omirov, B. A.; Bull. Malays. Math. Sci. Soc. 40 (2017), no. 1, 295-306. (here)
  • Representability of actions in the category of (pre)crossed modules in Leibniz algebras.
    Atik, M.; Aytekin, A.; Uslu, E.O.; Comm. Algebra 45 (2017), no. 5, 1825-1841. (here)
  • Global integration of Leibniz algebras.
    Bordemann, Martin; Wagemann, Friedrich; J. Lie Theory 27 (2017), no. 2, 555-567. (here)
  • On classification of four-dimensional nilpotent Leibniz algebras.
    Demir, Ismail; Misra, Kailash C.; Stitzinger, Ernie; Comm. Algebra 45 (2017), no. 3, 1012-1018. (here)
  • Some new results for Leibniz algebras and non-associative algebras.
    Li, Y.; Mo, Q. H.; Southeast Asian Bull. Math. 41 (2017), no. 1, 45-54. (not availabile yet)
  • Non-Abelian gerbes and enhanced Leibniz algebras.
    Strobl, Thomas; Phys. Rev. D 94 (2016), no. 2, 021702, 6 pp. (here)
  • Some Criteria for Solvable ane Supersolvable Leibniz Algebras
    Turner, Bethany Nicole; Thesis (Ph.D.)-North Carolina State University. 2016. 71 pp. (here)
  • Classification of 5-Dimensional Complex Nilpotent Leibniz Algebras.
    Demir, Ismail; Thesis (Ph.D.)-North Carolina State University. 2016. 147 pp. (here)