Minimal surfaces in R4 foliated by conic sections and parabolic rotations of holomorphic null curves in C4

Abstract

Using the complex parabolic rotations of holomorphic null curves in C4, we transform minimal surfaces in Euclidean space R3 ⊂ R4 to a family of degenerate minimal surfaces in Euclidean space R4. Applying our deformation to holomorphic null curves in C3 ⊂ C4 induced by helicoids in R3, we discover new minimal surfaces in R4 foliated by conic sections with eccentricity grater than 1: hyperbolas or straight lines. Applying our deformation to holomorphic null curves in C3 induced by catenoids in R3, we can rediscover the Hoffman-Osserman catenoids in R4 foliated by conic sections with eccentricity smaller than 1: ellipses or circles. We prove the existence of minimal surfaces in R4 foliated by ellipses, which converge to circles at infinity. We construct minimal surfaces in R4 foliated by parabolas: conic sections which have eccentricity 1.