Module 8: Summary, Cheat Sheet & Further Reading

Everything in One Place

A comprehensive summary of all QHO results, a downloadable LaTeX cheat sheet, and a guide to further reading in Shankar, Cohen-Tannoudji, and Griffiths.
Quantum Mechanics
QHO Course
Author Aditya Kumar
Published May 26, 2026

← Module 7 | ↑ Course Index

1 πŸŽ“ Congratulations β€” You’ve Completed the QHO Course!

You have journeyed from a classical spring to the quantum foundations of LIGO. Every equation was derived from first principles. You now understand why this system is called the most important in all of physics.

β€œThe harmonic oscillator is the drosophila of quantum mechanics.” β€” C. Cohen-Tannoudji

2 Complete Reference: All Key Results

2.1 The Fundamentals

2.1.1 Classical SHO

\[\ddot{x} + \omega^2 x = 0, \quad x(t) = A\cos(\omega t + \phi), \quad E = \tfrac{1}{2}m\omega^2 A^2\]

2.1.2 The QHO Hamiltonian (three forms)

\[\hat{H} = \frac{\hat{p}^2}{2m} + \frac{1}{2}m\omega^2\hat{x}^2 = \hbar\omega\!\left(\hat{N} + \tfrac{1}{2}\right) = \hbar\omega\!\left(\hat{a}^\dagger\hat{a} + \tfrac{1}{2}\right)\]

2.1.3 Energy Spectrum

\[E_n = \hbar\omega\!\left(n + \tfrac{1}{2}\right), \quad n = 0,1,2,\ldots \quad \text{(equally spaced, zero-point energy } E_0 = \tfrac{1}{2}\hbar\omega\text{)}\]

2.2 Ladder Operators

2.2.1 Definitions and Inversions

\[\hat{a} = \sqrt{\frac{m\omega}{2\hbar}}\!\left(\hat{x} + \frac{i\hat{p}}{m\omega}\right), \quad \hat{a}^\dagger = \sqrt{\frac{m\omega}{2\hbar}}\!\left(\hat{x} - \frac{i\hat{p}}{m\omega}\right)\] \[\hat{x} = \frac{x_0}{\sqrt{2}}(\hat{a} + \hat{a}^\dagger), \quad \hat{p} = \frac{i\hbar}{\sqrt{2}x_0}(\hat{a}^\dagger - \hat{a}), \quad x_0 = \sqrt{\frac{\hbar}{m\omega}}\]

2.2.2 Commutators

\[[\hat{a},\hat{a}^\dagger] = 1, \quad [\hat{N},\hat{a}] = -\hat{a}, \quad [\hat{N},\hat{a}^\dagger] = \hat{a}^\dagger\] \[[\hat{H},\hat{a}] = -\hbar\omega\hat{a}, \quad [\hat{H},\hat{a}^\dagger] = +\hbar\omega\hat{a}^\dagger\]

2.2.3 Action on Fock States

\[\hat{a}|n\rangle = \sqrt{n}\,|n-1\rangle, \quad \hat{a}^\dagger|n\rangle = \sqrt{n+1}\,|n+1\rangle, \quad |n\rangle = \frac{(\hat{a}^\dagger)^n}{\sqrt{n!}}|0\rangle\]

2.3 Wavefunctions

2.3.1 General Formula

\[\psi_n(x) = \left(\frac{m\omega}{\pi\hbar}\right)^{1/4}\frac{1}{\sqrt{2^n n!}} H_n\!\left(\frac{x}{x_0}\right)e^{-x^2/2x_0^2}\] - Parity: \(\psi_n(-x) = (-1)^n\psi_n(x)\) - Nodes: \(\psi_n\) has exactly \(n\) zeros - Ground state: \(\psi_0(x) = (\pi x_0^2)^{-1/4}\,e^{-x^2/2x_0^2}\) (Gaussian)

2.3.2 Expectation Values in \(|n\rangle\)

\[\langle\hat{x}\rangle = 0, \quad \langle\hat{p}\rangle = 0, \quad \langle\hat{x}^2\rangle = \left(n+\tfrac{1}{2}\right)x_0^2, \quad \langle\hat{p}^2\rangle = \left(n+\tfrac{1}{2}\right)\frac{\hbar^2}{x_0^2}\] \[\Delta x\,\Delta p = \left(n + \tfrac{1}{2}\right)\hbar \geq \frac{\hbar}{2}, \quad \langle T\rangle = \langle V\rangle = \frac{E_n}{2}\]

2.4 Time Evolution

2.4.1 Time-Evolved States

\[|n,t\rangle = e^{-i(n+1/2)\omega t}|n\rangle\] \[|\Psi(t)\rangle = \sum_n c_n e^{-i(n+1/2)\omega t}|n\rangle, \quad \text{Period } T = \frac{2\pi}{\omega}\]

2.4.2 Heisenberg Picture / Ehrenfest

\[\hat{a}(t) = e^{-i\omega t}\hat{a}(0), \quad \hat{x}(t) = x_0\cos\omega t\,\hat{x}(0) + \frac{\sin\omega t}{m\omega}\hat{p}(0)\] \[\frac{d^2}{dt^2}\langle\hat{x}\rangle = -\omega^2\langle\hat{x}\rangle \quad \text{(classical EOM for any quantum state)}\]

2.5 Coherent States

2.5.1 Definition and Expansion

\[\hat{a}|\alpha\rangle = \alpha|\alpha\rangle, \quad |\alpha\rangle = e^{-|\alpha|^2/2}\sum_{n=0}^{\infty}\frac{\alpha^n}{\sqrt{n!}}|n\rangle = \hat{D}(\alpha)|0\rangle\] \[\hat{D}(\alpha) = e^{\alpha\hat{a}^\dagger - \alpha^*\hat{a}} = e^{-|\alpha|^2/2}e^{\alpha\hat{a}^\dagger}e^{-\alpha^*\hat{a}}\]

2.5.2 Properties

\[\langle\hat{x}\rangle = \sqrt{2}x_0\,\text{Re}(\alpha), \quad \langle\hat{p}\rangle = \frac{\sqrt{2}\hbar}{x_0}\,\text{Im}(\alpha)\] \[\Delta x = \frac{x_0}{\sqrt{2}}, \quad \Delta p = \frac{\hbar}{\sqrt{2}x_0}, \quad \Delta x\,\Delta p = \frac{\hbar}{2}\] \[P(n) = e^{-|\alpha|^2}\frac{|\alpha|^{2n}}{n!} \quad \text{(Poisson)}, \quad \bar{n} = |\alpha|^2, \quad \Delta N = |\alpha|\] \[|\alpha(t)\rangle = e^{-i\omega t/2}|\alpha e^{-i\omega t}\rangle, \quad |\langle\beta|\alpha\rangle|^2 = e^{-|\alpha-\beta|^2}\] \[\frac{1}{\pi}\int|\alpha\rangle\langle\alpha|\,d^2\alpha = \hat{I} \quad \text{(over-completeness)}\]

2.6 Squeezed States

2.6.1 Squeeze Operator and Action

\[\hat{S}(\xi) = \exp\!\left(\tfrac{1}{2}\xi^*\hat{a}^2 - \tfrac{1}{2}\xi\hat{a}^{\dagger 2}\right), \quad \xi = re^{i\theta}\] \[\hat{S}^\dagger(r)\hat{a}\hat{S}(r) = \hat{a}\cosh r - \hat{a}^\dagger\sinh r \quad \text{(Bogoliubov)}\]

2.6.2 Squeezed Vacuum and Coherent Squeezed States

\[|0,r\rangle = \hat{S}(r)|0\rangle, \quad |\alpha,r\rangle = \hat{D}(\alpha)\hat{S}(r)|0\rangle\] \[\Delta x = \frac{x_0}{\sqrt{2}}e^{-r}, \quad \Delta p = \frac{\hbar}{\sqrt{2}x_0}e^{+r}, \quad \Delta x\,\Delta p = \frac{\hbar}{2}\] \[\langle\hat{N}\rangle_{\text{sq.vac}} = \sinh^2 r, \quad Q < 0 \text{ (sub-Poissonian, non-classical)}\]

3 Download the Cheat Sheet

3.1 πŸ“„ QHO Cheat Sheet (PDF)

A print-ready, two-page LaTeX-compiled cheat sheet with every formula from this course β€” ready for your exam, your desk, or your soul.

⬇️ Download PDF Cheat Sheet

LaTeX source also available: qho_cheatsheet.tex

4 Further Reading

4.0.1 πŸ“– Griffiths β€” Introduction to Quantum Mechanics (3rd ed.)

Chapter 2, Section 2.3: The harmonic oscillator β€” best first introduction. Clear, pedagogical, lots of examples.
Best for: Beginners and undergraduates. The analytic (Hermite polynomial) method is done very clearly.

4.0.2 πŸ“– Shankar β€” Principles of Quantum Mechanics (2nd ed.)

Chapter 7: The harmonic oscillator β€” the definitive algebraic treatment. Exercise 7.4.9 introduces coherent states.
Best for: Anyone who wants to understand the why behind the algebra. The notation is clean and the derivations are rigorous.

4.0.3 πŸ“– Cohen-Tannoudji, Diu & LaloΓ« β€” Quantum Mechanics (Vol. 1 & 2)

Chapter V: The harmonic oscillator β€” extremely systematic. Complement GV covers coherent states.
Best for: The most complete treatment. Read this when you want to make sure you haven’t missed anything.

4.0.4 πŸ“– Walls & Milburn β€” Quantum Optics (2nd ed.)

Chapter 2-3: Squeezed states, coherent states, phase space methods.
Best for: Graduate students going into quantum optics or quantum information. The definitive reference for squeezed states.

4.0.5 πŸ“– Gerry & Knight β€” Introductory Quantum Optics

Chapter 3: Coherent states and squeezed states with quantum optical applications.
Best for: A gentler introduction to quantum optics than Walls & Milburn.

5 What Comes Next?

Having mastered the QHO, you are now ready for:

  • Quantum Field Theory: The QHO is the building block of every quantum field β€” scalar, electromagnetic, fermionic.
  • Quantum Optics: Glauber-Sudarshan P-function, optical phase space, quantum state tomography.
  • Circuit QED: Superconducting qubits are quantized LC circuits (QHOs), the platform of modern quantum computers.
  • Many-Body Physics: Phonons, magnons, plasmons β€” all are collections of QHOs.
  • Perturbation Theory: Anharmonic corrections to the QHO (\(\lambda x^4\) potential) are the first test of perturbation theory.

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