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Communications in Algebra Volume 47, 2019 - Issue 5
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Original Articles

Normality and short exact sequences of Hopf-Galois structures

Alan KochDepartment of Mathematics, Agnes Scott College, Decatur, Georgia, USA;
,
Timothy KohlDepartment of Mathematics and Statistics, Boston University, Boston, Massachusetts, USA; Correspondence[email protected]
,
Paul J. TrumanSchool of Computing and Mathematics, Keele University, Staffordshire, UK;
&
Robert UnderwoodDepartment of Mathematics and Computer Science, Auburn University at Montgomery, Montgomery, Alabama, USA
Pages 2086-2101 | Received 08 Sep 2017, Accepted 05 Aug 2018, Published online: 22 Feb 2019

References

  • Chase, S. U., Sweedler, M. (1969). Hopf Algebras and Galois Theory. Number 97 in Lecture Notes in Mathematics. Berlin: Springer.
  • Childs, L. N. (2000). Taming Wild Extensions: Hopf Algebras and Local Galois Module Theory, vol. 80. Mathematical Surveys and Monographs. Providence, RI: American Mathematical Society.
  • O’Shea, D., Cox, D., Little, J. (2015). Ideals, Varieties, and Algorithms. New York, NY: Springer.
  • The GAP Group. (2002). GAP – Groups, Algorithms, and Programming, Version 4.3, Available at: http://www.gap-system.org.
  • Greither, C., Pareigis, B. (1987). Hopf Galois theory for separable field extensions. J. Algebra 106(1): 239–258.
  • Kohl, T. (2013). Regular permutation groups of order mp and Hopf-Galois structures. Algebra Numb. Theor. 7(9):2203–2240.
  • Radford, D. (2011). Hopf Algebras. Hackensack, NJ: World Scientific.
  • Vela, M., Crespo, T., Rio, A. (2016). Induced Hopf Galois structures. J. Algebra 457:312–322.
  • Vela, M., Crespo, T., Rio, A. (2016). On the Galois correspondence theorem in separable Hopf Galois theory. Publicacions Matemàtiques 60(1):221–234.

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