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DILLEN F, FASTENAKELS J, VAN DER VEKEN J, et al. Constant angle surfaces in S2×R[J]. Monatsh Math, 2007, 152:89-96.
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[2] |
DANIEL B. Isometric immersions into Sn×R and Hn×R and applications to minimal surfaces[J]. Trans Amer Math Soc, 2009, 361: 6 255-6 282.
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[3] |
BATISTA M. Simons type equation in S2×R and H2×R and applications[J]. Ann Inst Fourier (Grenoble), 2011, 61: 1 299-1 322.
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[4] |
CHEN Q, CUI Q. Normal scalar curvature and a pinching theorem in Sm×R and Hm×R [J].Sci China Math, 2011, 54:1 977-1 984.
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[5] |
CHEN H, CHEN G Y, LI H Z. Some pinching theorems for minimal submanifolds in Sm×R[J]. Sci China Math, 2013, 56: 1 679-1 688.
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[6] |
FETCU D, ONICIUC C, ROSENBERG H. Biharmonic submanifolds with parallel mean curvature in Sm×R[J]. J Geeom Anal, 2013, 23: 2 158-2 176.
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[7] |
LI A M, LI J M. An intrinsic rigidity theorem for minimal submanifolds in a sphere[J]. Arch Math (Basel), 1992, 58(6): 582-594.
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[8] |
ZHANG J F. A rigidity theorem for submanifolds in Sn+p with constant scalar curvature[J]. Journal of Zhejiang University SCIENCE, 2005, 6A(4): 322-328.
|
[1] |
DILLEN F, FASTENAKELS J, VAN DER VEKEN J, et al. Constant angle surfaces in S2×R[J]. Monatsh Math, 2007, 152:89-96.
|
[2] |
DANIEL B. Isometric immersions into Sn×R and Hn×R and applications to minimal surfaces[J]. Trans Amer Math Soc, 2009, 361: 6 255-6 282.
|
[3] |
BATISTA M. Simons type equation in S2×R and H2×R and applications[J]. Ann Inst Fourier (Grenoble), 2011, 61: 1 299-1 322.
|
[4] |
CHEN Q, CUI Q. Normal scalar curvature and a pinching theorem in Sm×R and Hm×R [J].Sci China Math, 2011, 54:1 977-1 984.
|
[5] |
CHEN H, CHEN G Y, LI H Z. Some pinching theorems for minimal submanifolds in Sm×R[J]. Sci China Math, 2013, 56: 1 679-1 688.
|
[6] |
FETCU D, ONICIUC C, ROSENBERG H. Biharmonic submanifolds with parallel mean curvature in Sm×R[J]. J Geeom Anal, 2013, 23: 2 158-2 176.
|
[7] |
LI A M, LI J M. An intrinsic rigidity theorem for minimal submanifolds in a sphere[J]. Arch Math (Basel), 1992, 58(6): 582-594.
|
[8] |
ZHANG J F. A rigidity theorem for submanifolds in Sn+p with constant scalar curvature[J]. Journal of Zhejiang University SCIENCE, 2005, 6A(4): 322-328.
|