A GLOBAL PINCHING THEOREM FOR COMPACT MINIMAL-SURFACES IN-S3

Title:	A GLOBAL PINCHING THEOREM FOR COMPACT MINIMAL-SURFACES IN-S3
Authors:	HSU, YJ 交大名義發表應用數學系 National Chiao Tung University Department of Applied Mathematics
Issue Date:	1-Dec-1991
Abstract:	Let M be a compact minimally immersed surface in the unit sphere S3, and let S denote the square of the length of the second fundamental form of M. We prove that if parallel-to S parallel-to 2 less-than-or-equal-to 2 square-root 2-pi, then M is either the equatorial sphere or the Clifford torus.
URI:	http://dx.doi.org/10.2307/2048782 http://hdl.handle.net/11536/3617
ISSN:	0002-9939
DOI:	10.2307/2048782
Journal:	PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY
Volume:	113
Issue:	4
Begin Page:	1041
End Page:	1044
Appears in Collections:	Articles

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APA	HSU, Y. (1991). GLOBAL PINCHING THEOREM FOR COMPACT MINIMAL-SURFACES IN-S3. WOS:A1991GV69300019.
Bibtex	@article{HSU1991GLOBAL, title={GLOBAL PINCHING THEOREM FOR COMPACT MINIMAL-SURFACES IN-S3}, author={HSU, YJ}, journal={WOS:A1991GV69300019}, year={1991}, url={https://ir.lib.nycu.edu.tw/handle/11536/3617}, }