Difference between revisions of "Wave mechanics"

Introduction

Wave mechanics studies the properties of wave functions. These are periodic functions that carry information due to their periodic nature. The best way to study a function is to see how it changes, which can be done using derivatives, or derivatives of derivatives.

Basic Equation

The basic equation of wave mechanics is a function that describes the position of a particle as a function of time and displacement, where the function is wavelike, such as sine or cosine:

y(x,t) = Ψ = Asin(kx - ωt)

A = amplitude

k = 2π/λ where λ = wavelength

w = 2πf = 2π/T where T = period

So if given the amplitude, wavelength and frequency of a particle that was behaving in a sine fashion, its position could be calculated at a particular time on the t axis using this equation. It would also give the particle position as a function of time at a particular distance on the x axis. Both plots y vs. x and y vs. t would be sine plots.

Partial Derivatives of basic wave equation

Use a table of derivatives to find the derivatives of the basic wave equation with respect to x and time.

∂y/∂x = Akcos(kx-ωt)

∂y/∂t = -Aωcos(kx-ωt)

Second Partial Derivatives of basic wave equation

∂²y/∂x² = -k²Asin(ωt-kx)

∂²y/∂t² = -ω²Asin(ωt-kx)

so 1/k² ∂²y/∂x² = 1/ω² ∂²y/∂t²

or 1/k² ∂²y/∂x² - 1/ω² ∂²y/∂t² = 0

Wave Equation in One Dimension

since the speed of a wave (v) is equal to ω/k, the above equation can be expressed in terms of wave velocity by multiplying by ω²:

v² ∂²y/∂x² - ∂²y/∂t² = 0

or:

v² ∂²y/∂x² = ∂²y/∂t²

Solutions to Wave Equation in One Dimension

using fourier transform:

1. multiply both sides by e^-ikx
2. integrate with respect to x

eventually end up with:

y(x,t) = F(x-vt) + G(x+vt)