An estimate for the genus of embedded surfaces in the 3-sphere

Abstract

By refining the volume estimate of Heintze and Karcher HK, we obtain a sharp pinching estimate for the genus of a surface in S3, which involves an integral of the norm of its traceless second fundamental form. More specifically, we show that if g is the genus of a closed orientable surface in a 3-dimensional orientable Riemannian manifold M whose sectional curvature is bounded below by 1, then 4 π2 g() 2(2 π2-|M|)+∫ f(| A|), where A is the traceless second fundamental form and f is an explicit function. As a result, the space of closed orientable embedded minimal surfaces with uniformly bounded \|A\|L3() is compact in the Ck topology for any k2.