Theory of Neutral Particles: Mclennan-Case Construct for Neutrino, Its Generalization, and a New Wave Equation

Abstract

Continuing our recent argument where we constructed a FNBWW-type spin-1 boson having opposite relative intrinsic parity to that of the associated antiparticle, we now study eigenstates of the Charge Conjugation operator. Based on the observation that if φ_L(pμ) transforms as a (0,\,j) spinor under Lorentz boosts, then [j]\,φ_L(pμ) transforms as a (j,\,0) spinor (with a similar relationship existing between φ_R(pμ) and [j]\,φ_R(pμ); where [j]\, J\,[j]-1\,=\,-\, J with [j] the well known Wigner matrix involved in the operation of time reversal) we introduce McLennan-Case type (j,\,0)(0,\,j) spinors. Relative phases between φ_R(pμ) and [j]\,φ_R(pμ), and [j]\,φ_L(pμ) and φ_L(pμ), turn out to have physical significance and are fixed by appropriate requirements. Explicit construction, and a series of physically relevant properties, for these spinors are obtained for spin-1/2 and spin-1 culminating in the construction of a new wave equation and introduction of Dirac-like and Majorana-like quantum fields.

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