Hsiang–Lawson's conjecture

In mathematics, Lawson's conjecture states that the Clifford torus is the only minimally embedded torus in the 3-sphere S³.^[1]^[2] The conjecture was featured by the Australian Mathematical Society Gazette as part of the Millennium Problems series.^[3]

In March 2012, Simon Brendle gave a proof of this conjecture, based on maximum principle techniques.^[4]

References[edit]

^ Lawson, H. Blaine Jr. (1970). "The unknottedness of minimal embeddings". Invent. Math. 11 (3): 183–187. Bibcode:1970InMat..11..183L. doi:10.1007/BF01404649. S2CID 122740925.
^ Lawson, H. Blaine Jr. (1970). "Complete minimal surfaces in S³". Ann. of Math. 92 (3): 335–374. doi:10.2307/1970625. JSTOR 1970625.
^ Norbury, Paul (2005). "The 12th problem" (PDF). The Australian Mathematical Society Gazette. 32 (4): 244–246.
^ Brendle, Simon (2013). "Embedded minimal tori in S³ and the Lawson conjecture". Acta Mathematica. 211 (2): 177–190. arXiv:1203.6597. doi:10.1007/s11511-013-0101-2. S2CID 119317563.

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[1] Lawson, H. Blaine Jr. (1970). "The unknottedness of minimal embeddings". Invent. Math. 11 (3): 183–187. Bibcode:1970InMat..11..183L. doi:10.1007/BF01404649. S2CID 122740925.

[2] Lawson, H. Blaine Jr. (1970). "Complete minimal surfaces in S³". Ann. of Math. 92 (3): 335–374. doi:10.2307/1970625. JSTOR 1970625.

[3] Norbury, Paul (2005). "The 12th problem" (PDF). The Australian Mathematical Society Gazette. 32 (4): 244–246.

[4] Brendle, Simon (2013). "Embedded minimal tori in S³ and the Lawson conjecture". Acta Mathematica. 211 (2): 177–190. arXiv:1203.6597. doi:10.1007/s11511-013-0101-2. S2CID 119317563.

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