Nonholonomic Ricci Flows: III. Curve Flows and Solitonic Hierarchies

The geometric constructions are performed on (semi) Riemannian manifolds and vector bundles provided with nonintegrable distributions defining nonlinear connection structures induced canonically by metric tensors. Such spaces are called nonholonomic manifolds and described by two equivalent linear connections also induced unique forms by a metric tensor (the Levi Civita and the canonical distinguished connection, d–connection). The lifts of geometric objects on tangent bundles are performed for certain classes of d–connections and frame transforms when the Riemann tensor is parametrized by constant matrix coefficients. For such configurations, the flows of non– stretching curves and corresponding bi–Hamilton and solitonic hierarchies encode information about Ricci flow evolution, Einstein spaces and exact solutions in gravity and geometric mechanics. The applied methods were elaborated formally in Finsler geometry and allows us to develop the formalism for generalized Riemann–Finsler and Lagrange spaces. Nevertheless, all geometric constructions can be equivalently re–defined for the Levi Civita connections and holonomic frames on (semi) Riemannian manifolds.