Reduction of continuous symmetries of chaotic flows by the method of slices

We study continuous symmetry reduction of dynamical systems by the method of slices (method of moving frames) and show that a ‘slice’ defined by minimizing the distance to a single generic ‘template’ intersects the group orbit of every point in the full state space. Global symmetry reduction by a single slice is, however, not natural for a chaotic/ turbulent flow; it is better to cover the reduced state space by a set of slices, one for each dynamically prominent unstable pattern. Judiciously chosen, such tessellation eliminates the singular traversals of the inflection hyperplane that comes along with each slice, an artifact of using the templates local group linearization globally. We compute the jump in the reduced state space induced by crossing the inflection hyperplane. As an illustration of the method, we reduce the SO (2) symmetry of the complex Lorenz equations.

► Continuous symmetry of a dynamical system is reduced by the method of slices. ► A slice minimizes the distance to a ‘template’ and intersects all group orbits. ► The inflection induced singularity jumps in the reduced state are computed. ► Turbulent flow reduced state space is covered by a set of slices. ► Illustrated by the reduction of SO (2) symmetry of the complex Lorenz equations.