On Everywhere Dense Imbedding of Free Groups in Lie Groups

Masatake Kuranishi

doi:10.1017/S0027763000010059

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In this note it will be proved that some kinds of Lie groups (including semi-simple Lie groups) have an everywhere dense subgroup which is algebraically isomorphic to the free group generated by two elements (Theorem 8),

In § 1 characterizations of Lie groups which are approximated by discrete subgroups’ are given. This section is closely connected with a part of the results of Malcev [4] and Matsushima [5], and some theorems are slight modifications of them (Theorems 2 and 3).

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[4] Malcev, , On a class of homogeneous space, Izvestiya Akad. Nauk SSR. Set. Math. 13 (1949) (in Russian).Google Scholar

[5] Matsushima, , On the discrete subgroups and homogeneous spaces of nilpotent Lie groups (in this issue).Google Scholar

[6] Pontrjagin, , Topological groups, Princeton, (1939).Google Scholar

[7] Tôyama, , On discrete subgroups of a Lie group. Kôdai Math. Sem. Rep. No. 2, pp. 36–37, (1949).Google Scholar

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