Factorizations of the groups of Lie type of Lie rank three over fields of 2 or 3 elements

Authors

  • Tsanko Gentchev
  • Kerope Tchakerian

Abstract

The following result is proved.

Let $G$ be a group of Lie type of Lie rank three over a field of 2 or 3 elements. Suppose that $G=AB$, where $A,B$ are proper non-Abelian simple subgroups of $G$. Then one of the following holds:

1) $G=L_4(2), A \cong L_3(2), B \cong A_6$ or $A_7$;

2)$G=L_4(3), A \cong L_3(3), B \cong S_4(3)$;

3) $G=S_6(2), A \cong L_4(2), B \cong L_2(8)$ or $A \cong U_4(2), B \cong L_2(8)$ or $U_3(3)$;

4) $G=U_6(2), A \cong U_5(2), B \cong S_6(2), U_4(3)$ or $M_{22}$

5) $G=U_6(3), A \cong U_5(3), B \cong S_6(3)$;

6) $G=O_7(3), A \cong L_4(3), B \cong U_3(3), G_2(3),S_6(2)$ or $A_9$ or $A \cong G_2(3), B \cong S_4(3), S_6(2)$

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Published

1993-12-12

How to Cite

Gentchev, T., & Tchakerian, K. (1993). Factorizations of the groups of Lie type of Lie rank three over fields of 2 or 3 elements. Ann. Sofia Univ. Fac. Math. And Inf., 85, 83–88. Retrieved from https://ftl5.uni-sofia.bg./index.php/fmi/article/view/457