Time evolution of quantum state with time ind Hamiltonian

ianmgull
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Homework Statement



Part e)

CQ1u1HP.jpg


Homework Equations



I know that the time evolution of a system is governed by a complex exponential of the hamiltonian:

|psi(t)> = Exp(-iHt) |psi(0)>

I know that |psi(0)> = (0, -2/Δ)

The Attempt at a Solution



I'm stuck on part e.

I was told by my professor that upon expanding the matrix exponential, I should get a familiar trig function. However I don't understand how this is possible.

Also, does this tell me that C+(t) will always be zero? Because the complex exponential multiplied by the first term in psi of zero is zero.
 
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ianmgull said:
I know that |psi(0)> = (0, -2/Δ)
Would it be preferable to normalize this state vector?

I'm stuck on part e.

I was told by my professor that upon expanding the matrix exponential, I should get a familiar trig function. However I don't understand how this is possible.
Explicitly evaluate ##H^2##, ##H^3##, ##H^4##, ##H^5##,... Do enough of these to see the pattern.

Also, does this tell me that C+(t) will always be zero? Because the complex exponential multiplied by the first term in psi of zero is zero.
##e^{-iHt}## is a matrix. This matrix operating on ##\left( 0, \, 1 \right)^t## will not necessarily produce a zero in the first entry of the output.
 
Thanks for the reply.

Your last point makes sense. I'm still having trouble wrapping my mind around matrix exponentials and forgot that the exponential would actually be a matrix.

I calculated the various powers of H like you mentioned. I definitely see a pattern: For Hn, the individual elements are raised to the power n, and also divided by 2n. However I don't understand how to make sense of this pattern in a matrix exponential.
 
ianmgull said:
I definitely see a pattern: For Hn, the individual elements are raised to the power n, and also divided by 2n. However I don't understand how to make sense of this pattern in a matrix exponential.
Can you describe what you got for ##H^2##?
Note ##H^2 = H H##, where ##H H## is matrix multiplication of ##H## times ##H##.
 

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