Gurses, M.Tek, S.2015-07-282015-07-282014-010362-546Xhttp://hdl.handle.net/11693/13348We consider 2-surfaces arising from the Korteweg-de Vries (KdV) hierarchy and the KdV equation. The surfaces corresponding to the KdV equation are in a three-dimensional Minkowski (M3) space. They contain a family of quadratic Weingarten and Willmore-like surfaces. We show that some KdV surfaces can be obtained from a variational principle where the Lagrange function is a polynomial function of the Gaussian and mean curvatures. We also give a method for constructing the surfaces explicitly, i.e., finding their parameterizations or finding their position vectors.© 2013 Elsevier Ltd. All rights reser.EnglishIntegrable EquationsShape EquationSoliton SurfacesWeingarten SurfacesWillmore SurfacesKorteweg-de Vries surfacesArticle10.1016/j.na.2013.08.025