Title of article
HYPERSURFACES OF S^(n+1) WITH TWO DISTINCT PRINCIPAL CURVATURES
Author/Authors
N. BARBOSA، JOSE نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2005
Pages
-148
From page
149
To page
0
Abstract
The aim of this paper is to prove that the Ricci curvature Ric(M) of a complete hypersurface M^n, n=>3, of the Euclidean sphere S^(n+1), with two distinct principal curvatures of multiplicity 1 and n-1, satisfies Ric(M) => inf f(H), for a function\, f depending only on n and the mean curvature H. Supposing in addition that M^n is compact, we will show that the equality occurs if and only if H is constant and M^n is isometric to a Clifford torus S^(n-1)(r) * S^1(radical(1-r^2)).
Keywords
admissible majorant , shift operator , inner function , Hardy space , model , Hilbert transform , subspace
Journal title
GLASGOW MATHEMATICAL JOURNAL
Serial Year
2005
Journal title
GLASGOW MATHEMATICAL JOURNAL
Record number
99281
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