In mathematics, a structure is a set endowed with some additional features on the set (e.g. an operation, relation, metric, or topology). Often, the additional features are attached or related to the set, so as to provide it with some additional meaning or significance.
Sometimes, a set is endowed with more than one feature simultaneously, which allows mathematicians to study the interaction between the different structures more richly. For example, an ordering imposes a rigid form, shape, or topology on the set, and if a set has both a topology feature and a group feature, such that these two features are related in a certain way, then the structure becomes a topological group.[1]
Mappings between sets which preserve structures (i.e., structures in the domain are mapped to equivalent structures in the codomain) are of special interest in many fields of mathematics. Examples are homomorphisms, which preserve algebraic structures; homeomorphisms, which preserve topological structures;[2] and diffeomorphisms, which preserve differential structures.
In 1939, the French group with the pseudonym Nicolas Bourbaki saw structures as the root of mathematics. They first mentioned them in their "Fascicule" of Theory of Sets and expanded it into Chapter IV of the 1957 edition.[3] They identified three mother structures: algebraic, topological, and order.[3][4]
Example: the real numbers
The set of real numbers has several standard structures:
An order: each number is either less or more than any other number.
Algebraic structure: there are operations of multiplication and addition that make it into a field.
^Saunders, Mac Lane (1996). "Structure in Mathematics" (PDF). Philosoph1A Mathemat1Ca. 4 (3): 176.
^Christiansen, Jacob Stordal (2015). "Mathematical structures" (PDF). maths.lth.se. Retrieved 2019-12-09.
^ abCorry, Leo (September 1992). "Nicolas Bourbaki and the concept of mathematical structure". Synthese. 92 (3): 315–348. doi:10.1007/bf00414286. JSTOR 20117057. S2CID 16981077.
^Wells, Richard B. (2010). Biological signal processing and computational neuroscience(PDF). pp. 296–335. Retrieved 7 April 2016.
Further reading
Foldes, Stephan (1994). Fundamental Structures of Algebra and Discrete Mathematics. Hoboken: John Wiley & Sons. ISBN9781118031438.
Hegedus, Stephen John; Moreno-Armella, Luis (2011). "The emergence of mathematical structures". Educational Studies in Mathematics. 77 (2): 369–388. doi:10.1007/s10649-010-9297-7. S2CID 119981368.
Malik, D.S.; Sen, M.K. (2004). Discrete mathematical structures : theory and applications. Australia: Thomson/Course Technology. ISBN978-0-619-21558-3.
Pudlák, Pavel (2013). "Mathematical structures". Logical foundations of mathematics and computational complexity a gentle introduction. Cham: Springer. pp. 2–24. ISBN9783319001197.
Senechal, M. (21 May 1993). "Mathematical Structures". Science. 260 (5111): 1170–1173. doi:10.1126/science.260.5111.1170. PMID 17806355.
External links
"Structure". PlanetMath. (provides a model theoretic definition.)
Mathematical structures in computer science (journal)
May 15, 2023
mathematical, structure, notion, structure, mathematical, logic, structure, mathematical, logic, this, article, includes, list, general, references, lacks, sufficient, corresponding, inline, citations, please, help, improve, this, article, introducing, more, p. For the notion of structure in mathematical logic see Structure mathematical logic This article includes a list of general references but it lacks sufficient corresponding inline citations Please help to improve this article by introducing more precise citations April 2016 Learn how and when to remove this template message In mathematics a structure is a set endowed with some additional features on the set e g an operation relation metric or topology Often the additional features are attached or related to the set so as to provide it with some additional meaning or significance A partial list of possible structures are measures algebraic structures groups fields etc topologies metric structures geometries orders events equivalence relations differential structures and categories Sometimes a set is endowed with more than one feature simultaneously which allows mathematicians to study the interaction between the different structures more richly For example an ordering imposes a rigid form shape or topology on the set and if a set has both a topology feature and a group feature such that these two features are related in a certain way then the structure becomes a topological group 1 Mappings between sets which preserve structures i e structures in the domain are mapped to equivalent structures in the codomain are of special interest in many fields of mathematics Examples are homomorphisms which preserve algebraic structures homeomorphisms which preserve topological structures 2 and diffeomorphisms which preserve differential structures Contents 1 History 2 Example the real numbers 3 See also 4 References 5 Further reading 6 External linksHistory EditIn 1939 the French group with the pseudonym Nicolas Bourbaki saw structures as the root of mathematics They first mentioned them in their Fascicule of Theory of Sets and expanded it into Chapter IV of the 1957 edition 3 They identified three mother structures algebraic topological and order 3 4 Example the real numbers EditThe set of real numbers has several standard structures An order each number is either less or more than any other number Algebraic structure there are operations of multiplication and addition that make it into a field A measure intervals of the real line have a specific length which can be extended to the Lebesgue measure on many of its subsets A metric there is a notion of distance between points A geometry it is equipped with a metric and is flat A topology there is a notion of open sets There are interfaces among these Its order and independently its metric structure induce its topology Its order and algebraic structure make it into an ordered field Its algebraic structure and topology make it into a Lie group a type of topological group See also EditAbstract structure Isomorphism Equivalent definitions of mathematical structures Intuitionistic type theory Space mathematics References Edit Saunders Mac Lane 1996 Structure in Mathematics PDF Philosoph1A Mathemat1Ca 4 3 176 Christiansen Jacob Stordal 2015 Mathematical structures PDF maths lth se Retrieved 2019 12 09 a b Corry Leo September 1992 Nicolas Bourbaki and the concept of mathematical structure Synthese 92 3 315 348 doi 10 1007 bf00414286 JSTOR 20117057 S2CID 16981077 Wells Richard B 2010 Biological signal processing and computational neuroscience PDF pp 296 335 Retrieved 7 April 2016 Further reading EditFoldes Stephan 1994 Fundamental Structures of Algebra and Discrete Mathematics Hoboken John Wiley amp Sons ISBN 9781118031438 Hegedus Stephen John Moreno Armella Luis 2011 The emergence of mathematical structures Educational Studies in Mathematics 77 2 369 388 doi 10 1007 s10649 010 9297 7 S2CID 119981368 Kolman Bernard Busby Robert C Ross Sharon Cutler 2000 Discrete mathematical structures 4th ed Upper Saddle River NJ Prentice Hall ISBN 978 0 13 083143 9 Malik D S Sen M K 2004 Discrete mathematical structures theory and applications Australia Thomson Course Technology ISBN 978 0 619 21558 3 Pudlak Pavel 2013 Mathematical structures Logical foundations of mathematics and computational complexity a gentle introduction Cham Springer pp 2 24 ISBN 9783319001197 Senechal M 21 May 1993 Mathematical Structures Science 260 5111 1170 1173 doi 10 1126 science 260 5111 1170 PMID 17806355 External links Edit Structure PlanetMath provides a model theoretic definition Mathematical structures in computer science journal Retrieved from https en wikipedia org w index php title Mathematical structure amp oldid 1124316351, wikipedia, wiki, book, books, library,
