Ted123
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micromass said:Try a very trivial Lie bracket. What's the easiest Lie bracket around??
The one that's identically 0
micromass said:Try a very trivial Lie bracket. What's the easiest Lie bracket around??
Ted123 said:The one that's identically 0
micromass said:Indeed!
Note that this is exactly the Lie algebra of the diagonal 3x3 matrices!
Ted123 said:So [itex]D_3(\mathbb{C})[/itex], the space of all 3x3 diagonal matrices with entries in [itex]\mathbb{C}[/itex] with lie bracket [itex][X,Y]= 0[/itex] for all [itex]X,Y\in D_3(\mathbb{C})[/itex] is not isomorphic to [itex]\mathfrak{g}[/itex] and [itex]\mathfrak{h}[/itex]?
When the question says 'show that your example meets the required conditions' does this mean I have to prove that it has dimension 3 and prove that it is not isomorphic?
Won't work. There will certainly exist homormorphisms between those Lie algebra's. But there might not exist any isomorphism.Would showing that a map from [itex]\mathfrak{f} \to \mathfrak{g}[/itex] and [itex]\mathfrak{f} \to \mathfrak{h}[/itex] defined by something aren't homomorphisms suffice?
micromass said:Yes.
Won't work. There will certainly exist homormorphisms between those Lie algebra's. But there might not exist any isomorphism.
So, take [itex]\varphi[/itex] an isomorphism and try to deduce a contradiction.
Ted123 said:assume I have a mapping that is an isomorphism (even though it isn't) and contradict the assumption.
micromass said:Yes, but you won't be able to do this with Lie algebra's which are isomorphic.
micromass said:No, you can't take a specific [itex]\varphi[/itex].
What you do is take an arbitrary homomorphism [itex]\varphi[/itex] and assume that it is an isomorphism. You then show a contradiction.
You know nothing about [itex]\varphi[/itex] except that it's an isomorphism.
micromass said:Try to calculate
[tex]\varphi [E,F],~\varphi [F,G],~\varphi [E,G][/tex]
in several ways. See if you can get a contradiction.
Ted123 said:Are we talking about the same [itex]E,F,G \in\mathfrak{g}[/itex] as before?
I thought I had to do something with diagonal matrices in [itex]\mathfrak{f}[/itex] and show that the lie bracket [x,y]=0 can't be satisfied?
micromass said:Yes.
That works as well.
micromass said:Is this an exam??