The Quaternionic Quantum Mechanics

Abstract

A quaternionic wavefunction consisting of real and scalar functions is found to satisfy the quaternionic momentum eigenvalue equation. Each of these components are found to satisfy a generalized wave equation of the form 1c2∂20∂ t2 - ∇20+2(m0)∂0∂ t+(m0c)20=0. This reduces to the massless Klein-Gordon equation, if we replace ∂∂ t∂∂ t+m0c2. For a plane wave solution the angular frequency is complex and is given by ω=im0c2 ck , where k is the propagation constant vector. This equation is in agreement with the Einstein energy-momentum formula. The spin of the particle is obtained from the interaction of the particle with the photon field.