See fiber bundle in All languages combined, or Wiktionary
Download JSON data for fiber bundle meaning in English (6.7kB)
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"2": "fibre bundle"
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"1": "en",
"2": "fiber"
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"1": "en",
"2": "fiber space"
},
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"2": "gefaserter Räume"
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"etymology_text": "Coined as fibre bundle by American mathematician Norman Steenrod in 1951, The Topology of Fibre Bundles. The related usages fiber and fiber space probably derive (as calques respectively of German Faser and gefaserter Räume) from 1933, Herbert Seifert, “Topologie dreidimensionaler gefaserter Räume,” Acta Mathematica, 60, (1933), 147-238.",
"forms": [
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{
"text": "A Möbius strip is a fiber bundle which looks locally (i.e., over a connected proper subset of its base space) like the corresponding part of a cylinder S¹#x5C;times#x5B;0,1#x5D; (a Möbius strip and a cylinder have isomorphic base spaces). A Klein bottle is a fiber bundle which looks locally like the corresponding part of a torus S¹#x5C;timesS¹ (again they could be thought of as sharing the same base space S¹; cutting out even a single point of that base space makes the cut Klein bottle isomorphic to the cut torus).",
"type": "example"
},
{
"text": "In general, a fiber bundle consists of a set of mutually disjoint fibers “over” a base space, which indexes the fibers; there is a copy of some fiber on top of, or projecting (“canonically”) onto each point of the base space.",
"type": "example"
},
{
"ref": "1995, Sunny Y. Auyang, How is Quantum Field Theory Possible?, Oxford University Press, page 214",
"text": "In the 1960s, some physicists including E. Lubkin and A. Trautman recognized that interaction potentials can be represented by connections on principal fiber bundles. In 1975, T. T. Wu and C. N. Yang used the fiber bundle method to solve a problem on magnetic monopoles.",
"type": "quotation"
},
{
"ref": "2001, John M. May, Parallel I/O for High Performance Computing, Morgan Kaufmann Publishers, page 236",
"text": "One proposed general model for high-level scientific data uses fiber bundles, which Butler and Pendley [22] proposed in 1989.[…] A fiber bundle is the Cartesian product of the fibers and the base space; in other words, it is the collection of valid data ranges for the base space.",
"type": "quotation"
},
{
"ref": "2013, Patrick Iglesias-Zemmour, Diffeology, American Mathematical Society, page 229",
"text": "Finding the right notion of fiber bundle for diffeology [Igl85] has been a question raised by the study of the irrational torus T#x5F;#x5C;alpha [Dolg85].",
"type": "quotation"
}
],
"glosses": [
"An abstract object in topology where copies of one object are \"attached\" to every point of another, as hairs or fibers are attached to a hairbrush. Formally, a topological space E (called the total space), together with a topological space B (called the base space), a topological space F (called the fiber), and surjective map π from E to B (called the projection or submersion), such that every point of B has a neighborhood U with π⁻¹(U) homeomorphic to the product space U × F (that is, E looks locally the same as the product space B × F, although its global structure may be quite different)."
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"word": "bundle"
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"sense": "topological space",
"word": "vector bundle"
}
],
"id": "en-fiber_bundle-en-noun-vgMEUgs5",
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"(American spelling, topology, category theory) An abstract object in topology where copies of one object are \"attached\" to every point of another, as hairs or fibers are attached to a hairbrush. Formally, a topological space E (called the total space), together with a topological space B (called the base space), a topological space F (called the fiber), and surjective map π from E to B (called the projection or submersion), such that every point of B has a neighborhood U with π⁻¹(U) homeomorphic to the product space U × F (that is, E looks locally the same as the product space B × F, although its global structure may be quite different)."
],
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{
"word": "associated bundle"
},
{
"word": "base space"
},
{
"word": "fiber space"
},
{
"word": "fibration"
},
{
"word": "principal bundle"
},
{
"word": "structure group"
},
{
"word": "total space"
},
{
"word": "trivial bundle"
}
],
"synonyms": [
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"word": "fibre bundle"
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],
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"code": "ca",
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"tags": [
"masculine"
],
"word": "fibrat"
},
{
"code": "fi",
"lang": "Finnish",
"sense": "topological space",
"word": "kuitukimppu"
},
{
"code": "de",
"lang": "German",
"sense": "topological space",
"tags": [
"neuter"
],
"word": "Faserbündel"
},
{
"code": "ko",
"lang": "Korean",
"roman": "oldabal",
"sense": "topological space",
"word": "올다발"
},
{
"code": "pt",
"lang": "Portuguese",
"sense": "topological space",
"tags": [
"masculine"
],
"word": "fibrado"
}
],
"wikipedia": [
"Herbert Seifert",
"Norman Steenrod",
"Project Euclid",
"fiber bundle"
]
}
],
"word": "fiber bundle"
}
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"etymology_text": "Coined as fibre bundle by American mathematician Norman Steenrod in 1951, The Topology of Fibre Bundles. The related usages fiber and fiber space probably derive (as calques respectively of German Faser and gefaserter Räume) from 1933, Herbert Seifert, “Topologie dreidimensionaler gefaserter Räume,” Acta Mathematica, 60, (1933), 147-238.",
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"lang": "English",
"lang_code": "en",
"meronyms": [
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"sense": "topological space",
"word": "base space"
},
{
"sense": "topological space",
"word": "fiber"
},
{
"sense": "topological space",
"word": "cross section"
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],
"pos": "noun",
"related": [
{
"word": "associated bundle"
},
{
"word": "base space"
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{
"word": "fiber space"
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{
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{
"word": "principal bundle"
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{
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{
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"text": "A Möbius strip is a fiber bundle which looks locally (i.e., over a connected proper subset of its base space) like the corresponding part of a cylinder S¹#x5C;times#x5B;0,1#x5D; (a Möbius strip and a cylinder have isomorphic base spaces). A Klein bottle is a fiber bundle which looks locally like the corresponding part of a torus S¹#x5C;timesS¹ (again they could be thought of as sharing the same base space S¹; cutting out even a single point of that base space makes the cut Klein bottle isomorphic to the cut torus).",
"type": "example"
},
{
"text": "In general, a fiber bundle consists of a set of mutually disjoint fibers “over” a base space, which indexes the fibers; there is a copy of some fiber on top of, or projecting (“canonically”) onto each point of the base space.",
"type": "example"
},
{
"ref": "1995, Sunny Y. Auyang, How is Quantum Field Theory Possible?, Oxford University Press, page 214",
"text": "In the 1960s, some physicists including E. Lubkin and A. Trautman recognized that interaction potentials can be represented by connections on principal fiber bundles. In 1975, T. T. Wu and C. N. Yang used the fiber bundle method to solve a problem on magnetic monopoles.",
"type": "quotation"
},
{
"ref": "2001, John M. May, Parallel I/O for High Performance Computing, Morgan Kaufmann Publishers, page 236",
"text": "One proposed general model for high-level scientific data uses fiber bundles, which Butler and Pendley [22] proposed in 1989.[…] A fiber bundle is the Cartesian product of the fibers and the base space; in other words, it is the collection of valid data ranges for the base space.",
"type": "quotation"
},
{
"ref": "2013, Patrick Iglesias-Zemmour, Diffeology, American Mathematical Society, page 229",
"text": "Finding the right notion of fiber bundle for diffeology [Igl85] has been a question raised by the study of the irrational torus T#x5F;#x5C;alpha [Dolg85].",
"type": "quotation"
}
],
"glosses": [
"An abstract object in topology where copies of one object are \"attached\" to every point of another, as hairs or fibers are attached to a hairbrush. Formally, a topological space E (called the total space), together with a topological space B (called the base space), a topological space F (called the fiber), and surjective map π from E to B (called the projection or submersion), such that every point of B has a neighborhood U with π⁻¹(U) homeomorphic to the product space U × F (that is, E looks locally the same as the product space B × F, although its global structure may be quite different)."
],
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"raw_glosses": [
"(American spelling, topology, category theory) An abstract object in topology where copies of one object are \"attached\" to every point of another, as hairs or fibers are attached to a hairbrush. Formally, a topological space E (called the total space), together with a topological space B (called the base space), a topological space F (called the fiber), and surjective map π from E to B (called the projection or submersion), such that every point of B has a neighborhood U with π⁻¹(U) homeomorphic to the product space U × F (that is, E looks locally the same as the product space B × F, although its global structure may be quite different)."
],
"tags": [
"US"
],
"topics": [
"category-theory",
"computing",
"engineering",
"mathematics",
"natural-sciences",
"physical-sciences",
"sciences",
"topology"
],
"wikipedia": [
"Herbert Seifert",
"Norman Steenrod",
"Project Euclid",
"fiber bundle"
]
}
],
"synonyms": [
{
"tags": [
"British"
],
"word": "fibre bundle"
}
],
"translations": [
{
"code": "ca",
"lang": "Catalan",
"sense": "topological space",
"tags": [
"masculine"
],
"word": "fibrat"
},
{
"code": "fi",
"lang": "Finnish",
"sense": "topological space",
"word": "kuitukimppu"
},
{
"code": "de",
"lang": "German",
"sense": "topological space",
"tags": [
"neuter"
],
"word": "Faserbündel"
},
{
"code": "ko",
"lang": "Korean",
"roman": "oldabal",
"sense": "topological space",
"word": "올다발"
},
{
"code": "pt",
"lang": "Portuguese",
"sense": "topological space",
"tags": [
"masculine"
],
"word": "fibrado"
}
],
"word": "fiber bundle"
}
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