Continuity Criterion for Locally Bounded Endomorphisms of Connected Reductive Lie Groups
Tóm tắt
We prove that every locally bounded endomorphism
$$\pi$$
of a connected reductive Lie group taking the center of the group to the center is continuous if and only if the restriction
$$\pi|_Z$$
of
$$\pi$$
to the center
$$Z$$
of
$$G$$
is continuous with respect to the same topology.
Tài liệu tham khảo
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