The study of unitarization of representations for non compact real forms of
simple Lie Algebras has been achieved in the past decade by Jakobsen (JA81,
JA83) and by Enright, Howe and Wallach (EH83) following different paths but
arriving at the same final results. In order to discuss unitarity we need to
introduce a scalar product. This is done in sections II and III introducing a
sesquilinear form on the universal enveloping algebra (GL90). Such a
sesquilinear form was introduced by Harish-Chandra (HC55), Gel'fand and
Kirillov (GK69) and Shapovalov (SH72). The new developments given to Jakobsen
method in GEL90 are contained in sections IV and V. In section VI we summarize
the principal results due to Enright Howe and Wallach (EHW method). In section
VII we give the possible places for unitarity including those for which the
reduction level can't be higher than one and that were not considered in GEL90.
We see also in this section and in a explicit way how the Jakobsen method and
the EHW method give the same final results. This type of representations have
found applications in physics for a long time (see GK75, 82; GL83, 89; LO86, 89
and references contained therein) In sections VIII and IX we consider the
conformal and de Sitter algebras. In particular the construction of wave
equations for conformal multispinors and the wave equations in de Sitter space
are reviewed in sections X and XI. In the Appendix we give the representations
of the classical algebras in the subspace Omega extending the results obtained
in LG84 for the algebra A_l.