See sethood on Wiktionary
{ "etymology_templates": [ { "args": { "1": "en", "2": "set", "3": "hood" }, "expansion": "set + -hood", "name": "suffix" } ], "etymology_text": "From set + -hood.", "head_templates": [ { "args": { "1": "-" }, "expansion": "sethood (uncountable)", "name": "en-noun" } ], "lang": "English", "lang_code": "en", "pos": "noun", "senses": [ { "categories": [ { "kind": "other", "name": "English entries with incorrect language header", "parents": [ "Entries with incorrect language header", "Entry maintenance" ], "source": "w" }, { "kind": "other", "name": "English terms suffixed with -hood", "parents": [], "source": "w" }, { "kind": "other", "name": "Pages with 1 entry", "parents": [], "source": "w" }, { "kind": "other", "name": "Pages with entries", "parents": [], "source": "w" }, { "kind": "topical", "langcode": "en", "name": "Mathematics", "orig": "en:Mathematics", "parents": [ "Formal sciences", "Sciences", "All topics", "Fundamental" ], "source": "w" }, { "kind": "topical", "langcode": "en", "name": "Set theory", "orig": "en:Set theory", "parents": [ "Mathematics", "Formal sciences", "Sciences", "All topics", "Fundamental" ], "source": "w" } ], "examples": [ { "text": "William Van Ormen Quine (1969) Set Theory and Its Logic, →ISBN, page 302: “In the first edition I relativized the sethood condition insufficiently, failing to restrict the bound variables to sets”" }, { "text": "John Bigelow and Robert Pargetter (1990) Science and Necessity, →ISBN, page 368: “In fact, this can be used as a necessary condition for sethood: a universal is a set only if any given thing instantiates it either in all possible worlds or in none.”" }, { "text": "Yiannis N. Moschovakis (2006) Notes on Set Theory, →ISBN, page 111: “Each of (II)–(VI) grants sethood to a specific, explicitly defined collection of objects, it legitimizes a special case of the most appealing (if false) General Comprehension Principle 3.3.”" } ], "glosses": [ "The state of being a set." ], "id": "en-sethood-en-noun-aMNyvQDe", "links": [ [ "mathematics", "mathematics" ], [ "set", "set" ] ], "raw_glosses": [ "(mathematics) The state of being a set." ], "tags": [ "uncountable" ], "topics": [ "mathematics", "sciences" ] } ], "word": "sethood" }
{ "etymology_templates": [ { "args": { "1": "en", "2": "set", "3": "hood" }, "expansion": "set + -hood", "name": "suffix" } ], "etymology_text": "From set + -hood.", "head_templates": [ { "args": { "1": "-" }, "expansion": "sethood (uncountable)", "name": "en-noun" } ], "lang": "English", "lang_code": "en", "pos": "noun", "senses": [ { "categories": [ "English entries with incorrect language header", "English lemmas", "English nouns", "English terms suffixed with -hood", "English uncountable nouns", "Pages with 1 entry", "Pages with entries", "en:Mathematics", "en:Set theory" ], "examples": [ { "text": "William Van Ormen Quine (1969) Set Theory and Its Logic, →ISBN, page 302: “In the first edition I relativized the sethood condition insufficiently, failing to restrict the bound variables to sets”" }, { "text": "John Bigelow and Robert Pargetter (1990) Science and Necessity, →ISBN, page 368: “In fact, this can be used as a necessary condition for sethood: a universal is a set only if any given thing instantiates it either in all possible worlds or in none.”" }, { "text": "Yiannis N. Moschovakis (2006) Notes on Set Theory, →ISBN, page 111: “Each of (II)–(VI) grants sethood to a specific, explicitly defined collection of objects, it legitimizes a special case of the most appealing (if false) General Comprehension Principle 3.3.”" } ], "glosses": [ "The state of being a set." ], "links": [ [ "mathematics", "mathematics" ], [ "set", "set" ] ], "raw_glosses": [ "(mathematics) The state of being a set." ], "tags": [ "uncountable" ], "topics": [ "mathematics", "sciences" ] } ], "word": "sethood" }
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This page is a part of the kaikki.org machine-readable All languages combined dictionary. This dictionary is based on structured data extracted on 2024-12-15 from the enwiktionary dump dated 2024-12-04 using wiktextract (8a39820 and 4401a4c). The data shown on this site has been post-processed and various details (e.g., extra categories) removed, some information disambiguated, and additional data merged from other sources. See the raw data download page for the unprocessed wiktextract data.
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