Lesson 264: Coordinate vs Momentum Representations

Introduction: Two Views of the Same State

A quantum state \(|\psi\rangle\) can be described in the position representation (wavefunction \(\psi(x)\)) or the momentum representation (\(\tilde{\psi}(p)\)). They contain the same information, related by Fourier transform.

Position Representation

In position representation:

Momentum Representation

In momentum representation:

The Fourier Transform Connection

\[\tilde{\psi}(p) = \frac{1}{\sqrt{2\pi\hbar}} \int_{-\infty}^{\infty} e^{-ipx/\hbar} \psi(x) \, dx\] \[\psi(x) = \frac{1}{\sqrt{2\pi\hbar}} \int_{-\infty}^{\infty} e^{ipx/\hbar} \tilde{\psi}(p) \, dp\]

Worked Examples

Example 1: Gaussian Wavepacket

A Gaussian in position space:

\[\psi(x) = \left(\frac{1}{\pi a^2}\right)^{1/4} e^{-x^2/2a^2}\]

Its Fourier transform is also Gaussian:

\[\tilde{\psi}(p) = \left(\frac{a^2}{\pi\hbar^2}\right)^{1/4} e^{-a^2p^2/2\hbar^2}\]

Width in x times width in p gives a constant (the uncertainty relation).

Example 2: Plane Wave

A momentum eigenstate \(|p_0\rangle\) in position representation:

\[\langle x|p_0\rangle = \frac{1}{\sqrt{2\pi\hbar}} e^{ip_0 x/\hbar}\]

A plane wave with wavelength \(\lambda = 2\pi\hbar/p_0\).

Example 3: Position Eigenstate in Momentum Space

\[\langle p|x_0\rangle = \frac{1}{\sqrt{2\pi\hbar}} e^{-ipx_0/\hbar}\]

Also a plane wave—the dual relationship is symmetric.

The Quantum Connection

The position and momentum representations are "conjugate" to each other. A state localized in position is spread in momentum, and vice versa. This is the mathematical content of the Heisenberg uncertainty principle:

\[\Delta x \cdot \Delta p \geq \frac{\hbar}{2}\]

You're now ready to study operators and eigenvalues in depth.