Erdoğdu, MelekYavuz, Ayşe2021-11-302021-11-302021-06-30https://doi.org/10.31801/cfsuasmas.724634http://hdl.handle.net/20.500.12575/76500The main scope of this paper is to examine the smoke ring (or vortex filament) equation which can be viewed as a dynamical system on the space curve in E³. The differential geometric properties the soliton surface accociated with Nonlinear Schrödinger (NLS) equation, which is called NLS surface or Hasimoto surface, are investigated by using Darboux frame. Moreover, Gaussian and mean curvature of Hasimoto surface are found in terms of Darboux curvatures k_{n}, k_{g} and τ_{g.}. Then, we give a different proof of that the s- parameter curves of NLS surface are the geodesics of the soliton surface. As applications we examine two NLS surfaces with Darboux Frame.enSmoke ring equationVortex Filament equationNLS surfaceDifferential geometric aspects of nonlinear Schrödinger equationArticle7015105212618-6470