Traveling wave solutions of the one-dimensional extended Landau-Lifshitz-Gilbert equation with nonlinear dry and viscous dissipations (Q1928078)

Computational simulations for a ferromagnetic nanowire are provided, namely the steady and average domain wall velocities that solve cubic equations are displayed versus the external magnetic field and the spin-torque velocity (\(u\)). The algebraic equations are derived from the following one-dimensional extended Landau-Lifshitz-Gilbert equation \[ \dot\mathbf{m}=\gamma \mathbf{h}_{\mathrm {eff}}\times \mathbf{m}- u \mathbf{m}_x-\eta u \mathbf{m}_x\times \mathbf{m}+ \mathbf{t}_ {\mathrm{d}}, \] where \( \mathbf{m}\) is the unit magnetization vector, \(\gamma \mathbf{h}_{\mathrm{eff}}\times \mathbf{m}\) stands for the precessional torque induced by the effective magnetic field \(\mathbf{h}_{\text{eff}}\) that accounts for external, exchange, anisotropy and demagnetizing fields, \(-u \mathbf{m}_x\) and \(-\eta u \mathbf{m}_x\times \mathbf{m}\) stand for, respectively, the adiabatic and non-adiabatic contributions to the current-induced spin-transfer-torque, and \(\mathbf{t}_ {\mathrm{d}}\) accounts for a generalization of the Gilbert damping torque which includes a rate-dependent viscous dissipation and a rate-independent dry friction.