See generalized element on Wiktionary
{
"forms": [
{
"form": "generalized elements",
"tags": [
"plural"
]
}
],
"head_templates": [
{
"args": {},
"expansion": "generalized element (plural generalized elements)",
"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": "Pages with 1 entry",
"parents": [],
"source": "w"
},
{
"kind": "other",
"name": "Pages with entries",
"parents": [],
"source": "w"
},
{
"kind": "topical",
"langcode": "en",
"name": "Category theory",
"orig": "en:Category theory",
"parents": [
"Mathematics",
"Formal sciences",
"Sciences",
"All topics",
"Fundamental"
],
"source": "w"
}
],
"examples": [
{
"ref": "1995, Colin McLarty, Elementary Categories, Elementary Toposes, Oxford University Press, page 17",
"text": "Thinking of x∈_AB as a generalized element, for any f:B→C, we may write f(x) for the composite f∘x. In this notation the first domain–codomain axiom reads as follows: for any x∈_AB and f:B→C there is a well-defined f(x)∈_AC; that is, at each stage A, f takes A-elements of B to A-elements of C.",
"type": "quotation"
}
],
"glosses": [
"A morphism whose codomain is some specified object."
],
"hyponyms": [
{
"word": "generic element"
}
],
"id": "en-generalized_element-en-noun-h~bULnGv",
"links": [
[
"category theory",
"category theory"
],
[
"morphism",
"morphism"
],
[
"codomain",
"codomain"
],
[
"object",
"object"
]
],
"raw_glosses": [
"(category theory) A morphism whose codomain is some specified object."
],
"topics": [
"category-theory",
"computing",
"engineering",
"mathematics",
"natural-sciences",
"physical-sciences",
"sciences"
]
}
],
"word": "generalized element"
}
{
"forms": [
{
"form": "generalized elements",
"tags": [
"plural"
]
}
],
"head_templates": [
{
"args": {},
"expansion": "generalized element (plural generalized elements)",
"name": "en-noun"
}
],
"hyponyms": [
{
"word": "generic element"
}
],
"lang": "English",
"lang_code": "en",
"pos": "noun",
"senses": [
{
"categories": [
"English countable nouns",
"English entries with incorrect language header",
"English lemmas",
"English multiword terms",
"English nouns",
"Pages with 1 entry",
"Pages with entries",
"en:Category theory"
],
"examples": [
{
"ref": "1995, Colin McLarty, Elementary Categories, Elementary Toposes, Oxford University Press, page 17",
"text": "Thinking of x∈_AB as a generalized element, for any f:B→C, we may write f(x) for the composite f∘x. In this notation the first domain–codomain axiom reads as follows: for any x∈_AB and f:B→C there is a well-defined f(x)∈_AC; that is, at each stage A, f takes A-elements of B to A-elements of C.",
"type": "quotation"
}
],
"glosses": [
"A morphism whose codomain is some specified object."
],
"links": [
[
"category theory",
"category theory"
],
[
"morphism",
"morphism"
],
[
"codomain",
"codomain"
],
[
"object",
"object"
]
],
"raw_glosses": [
"(category theory) A morphism whose codomain is some specified object."
],
"topics": [
"category-theory",
"computing",
"engineering",
"mathematics",
"natural-sciences",
"physical-sciences",
"sciences"
]
}
],
"word": "generalized element"
}
Download raw JSONL data for generalized element meaning in All languages combined (1.4kB)
This page is a part of the kaikki.org machine-readable All languages combined dictionary. This dictionary is based on structured data extracted on 2025-01-25 from the enwiktionary dump dated 2025-01-20 using wiktextract (c15a5ce and 5c11237). 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.
If you use this data in academic research, please cite Tatu Ylonen: Wiktextract: Wiktionary as Machine-Readable Structured Data, Proceedings of the 13th Conference on Language Resources and Evaluation (LREC), pp. 1317-1325, Marseille, 20-25 June 2022. Linking to the relevant page(s) under https://kaikki.org would also be greatly appreciated.