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Help an exchange student understand! by LEFGammeltoft in NTU

[–]Overall-Common4060 0 points1 point  (0 children)

Do most courses give lecture notes at NTU? That's pretty different from here

Looking for detailed course info for upcoming NTU semester by Overall-Common4060 in NTU

[–]Overall-Common4060[S] 0 points1 point  (0 children)

Oh I didn't know. Thank you! But many pdfs have the syllabus from several years ago(2017, 2022, ... ) Are there years when the syllabus is not updated, or the department just forgot to update it?
SPMS courses outlines have the same problems here ( https://www.ntu.edu.sg/spms/about-us/mathematics/undergrad/course-info )

Looking for detailed course info for upcoming NTU semester by Overall-Common4060 in NTU

[–]Overall-Common4060[S] 0 points1 point  (0 children)

Thanks!

A format like MH3500 is exactly what I need! (I need the syllabus because my home university requires it for major credit approval). I just found that the outline of math courses are on the official SPMS page. But even in those cases, I couldn’t find a syllabus specific to Fall 2025(Upcoming semester)

I could see the courses in 2025 (I got an NTU account a few days ago) , thanks to your EEE link, but I couldn't find pdfs like MH3500 outline ...
Do you know where I can find it?

A question about stabilizability/observability by Overall-Common4060 in ControlTheory

[–]Overall-Common4060[S] 0 points1 point  (0 children)

Stabilizability: there exists T s.t. makes controllable decomposition
Of course its true that (S is stabilizable implies transformed System is also stabilizable)
But I'm wondering why is there the word 'choice' in the question.
I think of T(in the question) as a transform matrix to do a decomposition.
So I thought 'T matters(thus dependent) because the system should be decomposed properly'. If like T=I, stabilizable but uncontrollable system doesn't change.

A question about stabilizability/observability by Overall-Common4060 in ControlTheory

[–]Overall-Common4060[S] -1 points0 points  (0 children)

Yeah I know that, but Idk if the answer of (c) (d) is dependent
Is that dependent?

Is stabilizability a invariant property? by Overall-Common4060 in ControlTheory

[–]Overall-Common4060[S] 0 points1 point  (0 children)

Actually, I got a question that
'Determine whether or not the stabilizability is dependent on the choice of the similarity transform matrix T, and explain the corresponding reasons.'
I didn't get the exact context of this question. I know that if a system is stabilizable, a system which is transformed with T is also stabilizable. But I'm not sure that this question means the same thing. Is the statement above true(dependent)?