Rotation operator (quantum mechanics)
Quantum operator
For other uses, see
Rotation operator (disambiguation)
.
Part of a series of articles about
Quantum mechanics
i
ℏ
d
d
t
|
Ψ
⟩
=
H
^
|
Ψ
⟩
{\displaystyle i\hbar {\frac {d}{dt}}|\Psi \rangle ={\hat {H}}|\Psi \rangle }
Schrödinger equation
Introduction
Glossary
History
Background
Classical mechanics
Old quantum theory
Bra–ket notation
Hamiltonian
Interference
Fundamentals
Complementarity
Decoherence
Entanglement
Energy level
Measurement
Nonlocality
Quantum number
State
Superposition
Symmetry
Tunnelling
Uncertainty
Wave function
Collapse
Experiments
Bell's inequality
CHSH inequality
Davisson–Germer
Double-slit
Elitzur–Vaidman
Franck–Hertz
Leggett inequality
Leggett–Garg inequality
Mach–Zehnder
Popper
Quantum eraser
Delayed-choice
Schrödinger's cat
Stern–Gerlach
Wheeler's delayed-choice
Formulations
Overview
Heisenberg
Interaction
Matrix
Phase-space
Schrödinger
Sum-over-histories (path integral)
Equations
Dirac
Klein–Gordon
Pauli
Rydberg
Schrödinger
Interpretations
Bayesian
Consistent histories
Copenhagen
de Broglie–Bohm
Ensemble
Hidden-variable
Local
Superdeterminism
Many-worlds
Objective-collapse
Quantum logic
Relational
Transactional
Von Neumann–Wigner
Advanced topics
Relativistic quantum mechanics
Quantum field theory
Quantum information science
Quantum computing
Quantum chaos
EPR paradox
Density matrix
Scattering theory
Quantum statistical mechanics
Quantum machine learning
Scientists
Aharonov
Bell
Bethe
Blackett
Bloch
Bohm
Bohr
Born
Bose
de Broglie
Compton
Dirac
Davisson
Debye
Ehrenfest
Einstein
Everett
Fock
Fermi
Feynman
Glauber
Gutzwiller
Heisenberg
Hilbert
Jordan
Kramers
Lamb
Landau
Laue
Moseley
Millikan
Onnes
Pauli
Planck
Rabi
Raman
Rydberg
Schrödinger
Simmons
Sommerfeld
von Neumann
Weyl
Wien
Wigner
Zeeman
Zeilinger
v
t
e
This article concerns the
rotation
operator
, as it appears in
quantum mechanics
.