Are Eigenkets with Eigenvalues Periodic for a Hamiltonian System?

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SUMMARY

The discussion centers on the periodicity of expectation values of observables in a Hamiltonian system with three eigenkets corresponding to eigenvalues 1, sqrt(2), and sqrt(3). It is established that for the system to exhibit periodic behavior, the ratios of the eigenvalues must be rational. Since both sqrt(2) and sqrt(3) are irrational, the conclusion is that the expectation values will not be periodic functions of time.

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greisen
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Hey,

A Hamiltonian has 3 eigenkets with three eigenvalues 1, sqrt(2) and sqrt(3) - will the expectation values of observables in general be period functions of time for this system?

I don't know how to procede?

Thnaks in advance
 
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To be periodic the three frequencies must be relatively rational.
 
sqrt(2) is not a rational number neither is sqrt(3). So when you say relative rational what do you mean?

Thanks in advance
 
That their ratio is a rational number.
 
So I thought - so with the eigenvalues posted they will not be periodic!

Thanks for the replies
 

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