Anisotropic Fast-Marching on cartesian grids using Lattice Basis Reduction
Numerical Analysis
2014-11-13 v3
Abstract
We introduce a modification of the Fast Marching Algorithm, which solves the generalized eikonal equation associated to an arbitrary continuous riemannian metric, on a two or three dimensional domain. The algorithm has a logarithmic complexity in the maximum anisotropy ratio of the riemannian metric, which allows to handle extreme anisotropies for a reduced numerical cost. We prove the consistence of the algorithm, and illustrate its efficiency by numerical experiments. The algorithm relies on the computation at each grid point of a special system of coordinates: a reduced basis of the cartesian grid, with respect to the symmetric positive definite matrix encoding the desired anisotropy at this point.
Cite
@article{arxiv.1201.1546,
title = {Anisotropic Fast-Marching on cartesian grids using Lattice Basis Reduction},
author = {Jean-Marie Mirebeau},
journal= {arXiv preprint arXiv:1201.1546},
year = {2014}
}
Comments
28 pages, 12 figures