Spatially localized solutions of plane Couette flow

We examine spatially localized solutions of plane Couette flow: traveling waves and equilibria with finite spanwise extent and periodic streamwise structure. We show that these solutions exist over a wide range of Reynolds numbers, from Re=170 to at least Re=4000, and demonstrate a relationship between the streamwise periodicity of a solution and the range of Reynolds number over which it appears. Some solutions display a diagonal or winding symmetry, suggestively similar to the diagonal bands of structure observed in large-scale simulations by Tuckermann and Barkley.