On the Quasi-Periodic Oscillations of Magnetars

TL;DR

This paper models torsional Alfvén oscillations in magnetars using a new coordinate system, revealing two families of QPOs that explain observed frequencies in specific soft gamma repeaters.

Contribution

It introduces a novel coordinate system to reduce the oscillation equations to 1+1 dimensions, enabling detailed analysis of QPOs in magnetars with various magnetic field configurations.

Findings

Identifies two families of QPOs: lower and upper frequencies.

Upper frequencies are odd multiples of lower frequencies.

Explains observed frequencies in SGR 1806-20 and SGR 1900+14.

Abstract

We study torsional Alfv\'en oscillations of magnetars, i.e., neutron stars with a strong magnetic field. We consider the poloidal and toroidal components of the magnetic field and a wide range of equilibrium stellar models. We use a new coordinate system (X,Y), where $X=\sqrt{a_1} \sin \theta$, $Y=\sqrt{a_1}\cos \theta$ and $a_1$ is the radial component of the magnetic field. In this coordinate system, the 1+2-dimensional evolution equation describing the quasi-periodic oscillations, QPOs, see Sotani et al. (2007), is reduced to a 1+1-dimensional equation, where the perturbations propagate only along the Y-axis. We solve the 1+1-dimensional equation for different boundary conditions and open magnetic field lines, i.e., magnetic field lines that reach the surface and there match up with the exterior dipole magnetic field, as well as closed magnetic lines, i.e., magnetic lines that never reach the stellar surface. For the open field lines, we find two families of QPOs frequencies; a family of "lower" QPOs frequencies which is located near the X-axis and a family of "upper" frequencies located near the Y-axis. According to Levin (2007), the fundamental frequencies of these two families can be interpreted as the turning points of a continuous spectrum. We find that the upper frequencies are constant multiples of the lower frequencies with a constant equaling 2n+1. For the closed lines, the corresponding factor is n+1 . By these relations, we can explain both the lower and the higher observed frequencies in SGR 1806-20 and SGR 1900+14.