Contractions of representations of de sitter groups

Mickelsson, J.; Niederle, J.

doi:10.1007/BF01645690

Contractions of representations of de sitter groups

J. Mickelsson
(
- ICTP, Trieste
)
,
J. Niederle
(
- ICTP, Trieste
)

1972

14 pages

Published in:

Commun.Math.Phys. 27 (1972) 167-180

DOI:

10.1007/BF01645690

View in:

OSTI Information Bridge Server

reference search53 citations

Citations per year

Abstract: (Springer)

In order to construct the quantum field theory in a curved space with no “old” infinities as the curvature tends to zero, the problem of contraction of representations of the corresponding group of motions is studied. The definitions of contraction of a local group and of its representations are given in a coordinate-free manner. The contraction of the principal continuous series of the de Sitter groupsSO0(n, 1) to positive mass representations of both the Euclidean and Poincaré groups is carried out in detail. It is shown that all positive mass continuous unitary irreducible representations of the resulting groups can be obtained by this method. For the Poincaré groups the contraction procedure yields reducible representations which decompose into two non-equivalent irreducible representations.

group theory: lorentz
mathematics
group theory: lie

References(0)

Figures(0)

0 References