Merging of momentum-space monopoles by controlling magnetic field: From cubic-Dirac to triple-Weyl fermion systems

Abstract

We analyze a generalized Dirac system, where the dispersion along the kx and ky axes is N-th power and linear along the kz axis. When we apply magnetic field, there emerge N monopole-antimonopole pairs beyond a certain critical field in general. As the direction of the magnetic field is rotated toward the z axis, monopoles move to the north pole while antimonopoles move to the south pole. When the magnetic field becomes parallel to the z axis, they merge into one monopole or one antimonopole whose monopole charge is N. The resultant system is a multiple-Weyl semimetal. Characteristic properties of such a system are that the anomalous Hall effect and the chiral anomaly are enhanced by N times and that N Fermi arcs appear. These phenomena will be observed experimentally in the cubic-Dirac and triple-Weyl fermion systems (N=3).