Estimates of the first eigenvalue of minimal hypersurfaces of Sn+1

Abstract

We consider a solution f of a certain Dirichlet Problem on a domain in S(n+1) whose boundary is a minimal hypersurface and we prove a Poincare type inequality for f. One have equality iff Yau's conjecture about the first non-zero eigenvalue of closed minimal hypersurfaces of S(n+1) is true.

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