See Lickorish-Wallace theorem on Wiktionary
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{ "etymology_text": "The theorem was proved independently in the early 1960s by W. B. R. Lickorish and Andrew H. Wallace.", "head_templates": [ { "args": {}, "expansion": "Lickorish-Wallace theorem", "name": "en-proper noun" } ], "lang": "English", "lang_code": "en", "pos": "name", "senses": [ { "categories": [ "English entries with incorrect language header", "English eponyms", "English lemmas", "English multiword terms", "English proper nouns", "English uncountable nouns", "Pages with 1 entry", "Pages with entries", "en:Mathematics" ], "glosses": [ "The theorem that any closed, orientable, connected 3-manifold may be obtained by performing Dehn surgery on a framed link in the 3-sphere with ±1 surgery coefficients, and that each component of the link can be assumed to be unknotted." ], "links": [ [ "mathematics", "mathematics" ], [ "theorem", "theorem" ], [ "closed", "closed" ], [ "orientable", "orientable" ], [ "connected", "connected" ], [ "manifold", "manifold" ], [ "Dehn surgery", "Dehn surgery" ], [ "link", "link" ], [ "sphere", "sphere" ], [ "coefficient", "coefficient" ], [ "unknotted", "unknotted" ] ], "raw_glosses": [ "(mathematics) The theorem that any closed, orientable, connected 3-manifold may be obtained by performing Dehn surgery on a framed link in the 3-sphere with ±1 surgery coefficients, and that each component of the link can be assumed to be unknotted." ], "topics": [ "mathematics", "sciences" ], "wikipedia": [ "Lickorish-Wallace theorem" ] } ], "word": "Lickorish-Wallace theorem" }
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