The statement-title above is a result that should follow from the hint I got to solve it: "Show that

Summer Bradford

Summer Bradford

Answered question

2022-06-23

The statement-title above is a result that should follow from the hint I got to solve it: "Show that the inversion map i : G G   ,   g g 1 is a Lie group homomorphism if G is commutative, and then study the resulting Lie algebra homomorphism." The first part of this hint was easy, but I am not getting any further. I think the corresponding homomorphism should be the total derivative of i evaluated in the identity of G , but I'm not getting anywhere with this idear yet.
I think the trivial Lie bracket should be [ X , Y ] = 0 for two vector fields on G, which holds iff the corresponding flows of X and Y commute.

Answer & Explanation

hopeloothab9m

hopeloothab9m

Beginner2022-06-24Added 25 answers

Hint: The derivative of i at e is i d g ; just check what it means that i d is a Lie algebra homomorphism.
Reginald Delacruz

Reginald Delacruz

Beginner2022-06-25Added 7 answers

Thank you, thanks to you, I can solve my problem with other numbers

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