On the Dirac equation in anisotropic backgrounds

The derivation of the kernel for the Feynman chessboard model in \(1+1\) dimensions is sketched in such a way that a formal extension to \(3+1\) dimensions is readily obtained. This extension is then examined so as to clarify the nature of the paths in three-dimensional space. We also consider how s

We prove that a Sasakian 3-manifold admitting a non-trivial solution to the Einstein-Dirac equation has necessarily constant scalar curvature. In the case when this scalar curvature is non-zero, their classification follows then from a result by Th. Friedrich and E.C. Kim. We also prove that a scala

It is shown that the spurious roots appearing among solutions of the algebraic Dirac Hamiltonian eigenvalue problem represent the positive spectrum states of the Dirac Hamiltonian and that each of them has its variational nonrelativistic counterpart.

In this paper, we discuss the anisotropic static Landau-Lifshitz equations. We obtain maximum principles and existence results for the small solutions to the Dirichlet problems and the initial-boundary value problems of the corresponding evolution equations. We also construct multiple large smooth s