Add to ORKGWe study geometric curves flows whose invariants flow according to some soliton equations. We discuss the correspondences between the Schr"odinger flows on Hermitian symmetric spaces and equations of the nonlinear Schr"odinger(NLS) type. And we use these correspondences to construct B"acklund transformations for these curve flows. We also study the geometric Airy curve flows on space forms whose invariants satisfy the vector modified KdV(vmKdV) type equations. The existence of solutions to the Cauchy problems of curve flows for periodic boundary conditions follows from the correspondence. We then obtain geometric algorithms to solve periodic Cauchy problems numerically.補正完
This note surveys and compares results in [12] and [21, 22] on the separation of variables construct...
We investigate how to obtain various flows of K"ahler metrics on a fixed manifold as variations of K...
A method of Sym and Pohlmeyer, which produces geometric re-alizations of many integrable systems, is...
We study geometric curves flows whose invariants flow according to some soliton equations. We discus...
We study the Bäcklund transformations of integrable geometric curve flows in certain geometries. The...
Among other things, we introduce the notion of KdV curves and Schrodinger-Airy curves. These curves ...
A geometric flow is a process which is defined by a differential equation and is used to evolve a ge...
The Hodge star mean curvature flow on a 3‑dimensional Riemannian or pseudo-Riemannian manifold is on...
A geometric flow is a process which is defined by a differential equation and is used to evolve a ge...
We study the relation between the centro-affine geometry of star-shaped planar curves and the projec...
Abstract. We apply the equivariant method of moving frames to investigate the ex-istence of Poisson ...
In this thesis, I present non-stiff pseudo-spectral methods to study 2-D curves that follow dispersi...
International audienceWe exhibit a time reversible geometric flow of planar curves which can develop...
International audienceWe exhibit a time reversible geometric flow of planar curves which can develop...
An intrinsic geometric flow is an evolution of a Riemannian metric by a two-tensor. An extrinsic geo...
This note surveys and compares results in [12] and [21, 22] on the separation of variables construct...
We investigate how to obtain various flows of K"ahler metrics on a fixed manifold as variations of K...
A method of Sym and Pohlmeyer, which produces geometric re-alizations of many integrable systems, is...
We study geometric curves flows whose invariants flow according to some soliton equations. We discus...
We study the Bäcklund transformations of integrable geometric curve flows in certain geometries. The...
Among other things, we introduce the notion of KdV curves and Schrodinger-Airy curves. These curves ...
A geometric flow is a process which is defined by a differential equation and is used to evolve a ge...
The Hodge star mean curvature flow on a 3‑dimensional Riemannian or pseudo-Riemannian manifold is on...
A geometric flow is a process which is defined by a differential equation and is used to evolve a ge...
We study the relation between the centro-affine geometry of star-shaped planar curves and the projec...
Abstract. We apply the equivariant method of moving frames to investigate the ex-istence of Poisson ...
In this thesis, I present non-stiff pseudo-spectral methods to study 2-D curves that follow dispersi...
International audienceWe exhibit a time reversible geometric flow of planar curves which can develop...
International audienceWe exhibit a time reversible geometric flow of planar curves which can develop...
An intrinsic geometric flow is an evolution of a Riemannian metric by a two-tensor. An extrinsic geo...
This note surveys and compares results in [12] and [21, 22] on the separation of variables construct...
We investigate how to obtain various flows of K"ahler metrics on a fixed manifold as variations of K...
A method of Sym and Pohlmeyer, which produces geometric re-alizations of many integrable systems, is...