The first arrival traveltime for the propagation of a wave, in the high frequency approximation, is described by the eikonal equation, or possibly a variant with coefficients depending on the medium properties. We present numerical schemes for the computation of the solution to such eikonal equations. These numerical schemes are based on the Fast Marching method (FMM), generalized to complex and non-Riemannian anisotropy settings in 3D media. The FMM is a single pass method, in which the propagation front is discretized and followed throughout the medium, leading to fast computation time. We also explore an opposite paradigm for high performance computation, based on a massively parallel GPU solver.In particular, we consider the case of sei...