Gravitational Waves in Higher Order Teleparallel Gravity

Abstract

The teleparallel equivalent of higher order Lagrangians like L R=-R+a0R2+a1R R can be obtained by means of the boundary term B=2∇μTμ. In this perspective, we derive the field equations in presence of matter for higher-order teleparallel gravity considering, in particular, sixth-order theories where the operator is linearly included. In the weak field approximation, gravitational wave solutions for these theories are derived. Three states of polarization are found: the two standard + and × polarizations, namely 2-helicity massless transverse tensor polarizations, and a 0-helicity massive, with partly transverse and partly longitudinal scalar polarization. Moreover, these gravitational waves exhibit four oscillation modes related to four degrees of freedom: the two classical + and × tensor modes of frequency ω1, related to the standard Einstein waves with k21=0; two mixed longitudinal-transverse scalar modes for each frequencies ω2 and ω3, related to two different 4-wave vectors, k22=M22 and k23=M23. The four degrees of freedom are the amplitudes of each individual mode, i.e. ε(+)(ω1), ε(×)(ω1), B2(k), and B3(k).