Naked Singularity as Accelerator for Spinning Particle

Abstract

When two particles collide at the horizon of a black hole and one of them satisfies some critical conditions, the relative velocity between them can be arbitrarily large, thus the energy of the center-of-mass will reach infinity. Such a process is called BSW mechanism which can accelerate a particle to arbitrarily high energy. There are also some studies showing that a Kerr naked singularity can be more qualified as a particle accelerator for arbitrarily high energy. Previous researchers mainly concentrate on geodesic motion of particles. In this paper, we will take spinning particles which won't move along a timelike geodesic and carry more parameters into our consideration. By employing the Mathisson-Papapetrou-Dixon equation, we will prove that for a spinning particle in hyper-extremal Reissner-Nordstrom or Kerr spacetime where exists a naked singularity at r=0, its Effective Potential Veff=-r2 must be able to reach zero within the interval 0 < r < M, thus an ingoing particle will be able to turn back and then collide with another ingoing particle at r=M. If the spacetime is slightly hyper-extremal, the energy of center of mass Ecm will be arbitrarily high.