Massive relativistic particle model with spin from free two-twistor dynamics and its quantization
Abstract
We consider a relativistic particle model in an enlarged relativistic phase space M18 = (Xμ, Pμ, ηα, , σα, , e, φ), which is derived from the free two-twistor dynamics. The spin sector variables (ηα, , σα,\ osigma) satisfy two second class constraints and account for the relativistic spin structure, and the pair (e,φ) describes the electric charge sector. After introducing the Liouville one-form on M18, derived by a non-linear transformation of the canonical Liouville one-form on the two-twistor space, we analyze the dynamics described by the first and second class constraints. We use a composite orthogonal basis in four-momentum space to obtain the scalars defining the invariant spin projections. The first-quantized theory provides a consistent set of wave equations, determining the mass, spin, invariant spin projection and electric charge of the relativistic particle. The wavefunction provides a generating functional for free, massive higher spin fields.
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