Area of minimal hypersurfaces

Abstract

A well-known conjecture of Yau states that the area of one of Clifford minimal hypersurfaces Sk(kn\, )× Sn-k(n-kn\, ) gives the lowest value of area among all non-totally geodesic compact minimal hypersurfaces in the unit sphere Sn+1(1). The present paper shows that Yau conjecture is true for minimal rotational hypersurfaces, more precisely, the area |Mn| of compact minimal rotational hypersurface Mn is either equal to |Sn(1)|, or equal to |S1(1n)× Sn-1(n-1n)|, or greater than 2(1-1π)|S1(1n)× Sn-1(n-1n)|. As the application, the entropies of some special self-shrinkers are estimated.