Minimal surfaces in S3 foliated by circles

Abstract

We deal with minimal surfaces in the unit sphere S3, which are one-parameter families of circles. Minimal surfaces in 3 foliated by circles were first investigated by Riemann, and a hundred years later Lawson constructed examples of such surfaces in S3. We prove that in S3 there are only two types of minimal surfaces foliated by circles, crossing the principal lines at a constant angle. The first type surfaces are foliated by great circles, which are bisectrices of the principal lines, and we show that these minimal surfaces are the well-known examples of Lawson. The second type surfaces, which are new in the literature, are families of small circles, and the circles are principal lines. We give a constructive formula for these surfaces. An application to the theory of minimal foliated semi-symmetric hypersurfaces in 4 is given.