Phy5646/Simpe Example of Time Dep Pert: Difference between revisions

Revision as of 00:57, 28 March 2010

This example taken from "Quantum Physics" 3rd ed., Stephen Gasiorowicz, p. 237-238.

Problem: A particle of charge $q$ in a one-dimensional harmonic oscillator of characteristic frequency $\omega$ is placed in an electric field that is turned on and off so that the potential energy is

$\lambda V(t)=qExe^{-t^{2}/\tau ^{2}}$

If the particle is initially in the ground state, what is the probability that after time t, such that t >£> t, the particle is found in the first excited state of the harmonic oscillator? What is the probability that it is found in the second excited state?

@@ Line 3: / Line 3: @@
 '''Problem:''' A particle of charge <math>q</math> in a one-dimensional harmonic oscillator of characteristic frequency <math>\omega</math> is placed in an electric field that is turned on and off so that the potential energy is
-<math>\lambda V(t) + q</math>
+<math>\lambda V(t) = qExe^{-t^{2}/\tau^{2}}</math>
+If the particle is initially in the ground state, what is the probability that after time t, such that t >£> t,
+the particle is found in the first excited state of the harmonic oscillator? What is the probability that
+it is found in the second excited state?

Phy5646/Simpe Example of Time Dep Pert: Difference between revisions

Revision as of 00:57, 28 March 2010

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