We present a time-local existence theorem of the initial value problem for a third-order dispersive evolution equation for open curves on compact almost Hermitian manifolds arising in the geometric analysis of vortex filaments. This equation causes the so-called loss of one-derivative since the target manifold is not supposed to be a K\"ahler manifold. We overcome this difficulty by using a gauge transformation of a multiplier on the pull-back bundle to eliminate the bad first order terms essentially.
A third-order dispersive flow for closed curves into Kähler manifolds
Approximate solutions to the initial value problem for some compressible flows in presence of shocks and void regions
On the support of solutions to the g-KdV equation
![QR code for arXiv:0805.3219 [math.AP]](http://oss.arxitics.com/images/favicon.svg)