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Gaussian Wavepacket in an Infinite square well

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Presentation on theme: "Gaussian Wavepacket in an Infinite square well"β€” Presentation transcript:

1 Gaussian Wavepacket in an Infinite square well
EPS 109 Presentation Edgar Dimitrov

2 Concepts 1D time dependent Schrodinger equation Solved by discretization then Crank-Nicolson method (average of forwards and reverse newton method) to get values at each time step. Reference: Numerical investigations of the long time solution of the Schrodinger iℏ 𝑑 𝑑𝑑 ψ(x, t) = [βˆ’ ℏ 2 2π‘š 𝛻 2 +𝑉(x)]ψ(x, t) Because of the imaginary terms, only ψ(x, t) 2 is physically relevant. Initial distribution: Gaussian Wave packet ψ(x)= 1 πœŽβˆ— πœ‹ 𝑒 βˆ’ π‘–π‘˜ 0 π‘₯ 𝑒 βˆ’(π‘₯βˆ’ π‘₯ 0 ) 2 2 𝜎 2 Minimum uncertainty βˆ†π‘₯βˆ†π‘β‰₯ℏ/2 Potentials: V(x) affects propagation, can be used to simulate various conditions

3 Infinite Square Well V(x)=0

4 Step Potential V(x)=.3 ; 0>x>5

5 Harmonic oscillator potential V(x)=1/2*m*w^2*x^2

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