71 research outputs found
On anti-de Sitter oscillators and de Sitter anti-oscillators
We revisit the principal arguments for interpreting the free quantum fields
on anti-de Sitter or de Sitter spacetimes of any dimensions as oscillators or
respectively anti-oscillators. In addition, we point out that there exists a
chart on the de Sitter background where the free Dirac field becomes a genuine
anti-oscillator in the non-relativistic limit in the sense of special
relativity.Comment: 7 pages, no figure
Canonical quantization of the covariant fields on de Sitter spacetimes
The properties of the covariant quantum fields on de Sitter spacetimes are
investigated focusing on the isometry generators and Casimir operators in order
to establish the equivalence among the covariant representations and the
unitary irreducible ones of the de Sitter isometry group. For the Dirac quantum
field it is shown that the spinor covariant representation, transforming the
Dirac field under de Sitter isometries, is equivalent with a direct sum of two
unitary irreducible representations of the group, transforming alike
the particle and antiparticle field operators in momentum representation. Their
basis generators and Casimir operators are written down finding that the
covariant representations are equivalent with unitary irreducible ones from the
principal series whose canonical weights are determined by the fermion mass and
spin.Comment: 41 pages no figures, some typos are correcte
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