All annihilation and decay processes obey the full spectrum of Conservation Laws where applicable, i.e conservation of spin, charge, mass, energy, momentum, quantum states, colours, etc.
Dirac Theory:
A Fermion is all particles with half integral spin:
s = \frac{1}{2}
The Dirac Fermion Theory was derived from the Time-independent Schrodinger equasion.
Time-independent Schrodinger equasion:
\frac{ \vartheta ^2 \psi}{ \vartheta x^2} = - \frac{ 2 m E}{ \hbar ^2} \psi
Dirac Fermion Spin equasion:
S = \sqrt{ s(s + 1)} \hbar = \frac{ \sqrt{ 3}}{ 2} \hbar
Spin angular momentum of Fermion.
According to Dirac Fermion Theory, all Fermions and anti-Fermions can only be created and destroyed in pairs.
\gamma -> e^- + e^+
e^- + e^+ -> \gamma
According to Dirac Hadron Theory, all Hadrons and anti-Hadrons can only be created and destroyed in pairs.
\gamma -> p^+ + \overline{ p} ^-
p^+ + \overline{ p} ^- -> \gamma
\gamma -> n + \overline{ n}
n + \overline{ n} -> \gamma
All Fermions have an anti-Fermion.
All Hadrons have an anti-Hadron.
Exceptions are the photon and Meson neutral pion ( \pi ^0) and eta ( \eta ^0).
The Meson pion and eta are their own anti-particles.
Dirac Theory obeys the Pauli Exclusion Principle.
Pauli Exclusion Principle:
No two Fermions in a volume can ever be in the same quantum state; no two Fermions in the same volume can have the same set of quantum numbers (n, l, m_l, m_s).
Protons and anti-Neutrons cannot spontaneously annihilate because they are not conserved Dirac Fermion or Hadron Pairs.
However they do annihilate, but it is not a complete annihilation.
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