Nonexistence of time-periodic solutions of the Dirac equation in nonextreme Kerr-Newman-AdS spacetime

Abstract

In non-extreme Kerr-Newman-AdS spacetime, we prove that there is no nontrivial Dirac particle which is Lp for 0<p≤43 with arbitrary eigenvalue λ, and for 43<p≤43-2q, 0<q<32 with eigenvalue |λ|>q , outside and away from the event horizon. By taking q=12, we show that there is no normalizable massive Dirac particle with mass greater than 2 outside and away from the event horizon in non-extreme Kerr-Newman-AdS spacetime, and they must either disappear into the black hole or escape to infinity, and this recovers the same result of Belgiorno and Cacciatori in the case of Q=0 obtained by using spectral methods. Furthermore, we prove that any Dirac particle with eigenvalue |λ|<2 must be L2 outside and away from the event horizon.