PlanetPhysics/Pauli Exclusion Principle

The Pauli exclusion principle states that [[../AntiCommutationRelations/|fermions]] are antisymmetric under [[../Particle/|particle]] exchange, and that as a consequence no two fermions may occupy the same quantum state. Mathematically, the exchange operator for a two-body wavefunction is

${\displaystyle \hat{X}\psi (1,2)=g\psi (2,1)}$

Normalisation considerations tell us that the eigenvalue, ${\displaystyle g}$ must be either ${\displaystyle \pm 1}$ (as the [[../QuantumOperatorAlgebra4/|operator]] must conserve probability). The Pauli exclusion principle then states that the eigenvalue is ${\displaystyle +1}$ for [[../Boson/|bosons]] and ${\displaystyle -1}$ for fermions, and that a wavefunction with an eigenvalue of ${\displaystyle -1}$ describes particles that cannot occupy the same quantum state. The spin-statistics [[../Formula/|theorem]] states that these particles are fermions, with half-integer [[../QuarkAntiquarkPair/|spin]].

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