The space-time symmetry group of a model of a relativistic spin 1/2
elementary particle, which satisfies Dirac's equation when quantized, is
analyzed. It is shown that this group, larger than the Poincare group, also
contains space-time dilations and local rotations. It has two Casimir
operators, one is the spin and the other is the spin projection on the body
frame. Its similarities with the standard model are discussed. If we consider
this last spin observable as describing isospin, then, this Dirac particle
represents a massive system of spin 1/2 and isospin 1/2. There are two possible
irreducible representations of this kind of particles, a colourless or a
coloured one, where the colour observable is also another spin contribution
related to the zitterbewegung. It is the spin, with its twofold structure, the
only intrinsic property of this Dirac elementary particle.Comment: Contribution to the JINR(Dubna) SPIN05 workshop, 18 pages, 1 figure.
Abstract and minor changes of sections 2 to