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Line 1: {{short description\|Describes the objects of a given type, up to some equivalence}} {{Unreferenced\|date=December 2009}} In [[mathematics]], a '''classification theorem''' answers the [[classification]] problem: "What are the objects of a given type, up to some [[Equivalence relation\|equivalence]]?". It gives a non-redundant [[enumeration]]: each object is equivalent to exactly one class. A few issues related ~~issues~~ to classification are the following. The ~~isomorphism~~equivalence problem is "given two objects, determine if they are equivalent". A [[complete set of invariants]], together with which invariants are realizable, solves the classification problem, and is often a step in solving it. (A combination of invariant values is realizable if there in fact exists an object whose invariants take on the specified set of values) A {{clarify span\|computable [[complete set of invariants]]\|reason=Shouldn't this be "finite set of computable invariants"? Computability (whatever this is supposed to mean on a set of functions) is of no help if infinitely many functions must be evaluated or if an uncomputable function must be evaluated.\|date=October 2020}} (together with which invariants are realizable) solves both the classification problem and the ~~isomorphism~~equivalence problem. A [[canonical form]] solves the classification problem, and is more data: it not only classifies every class, but ~~gives~~provides a distinguished (canonical) element of each class. There exist many '''classification theorems''' in [[mathematics]], as described below. ==Geometry== * {{annotated link\|Euclidean plane isometry#Classification of Euclidean plane isometries\|Classification of Euclidean plane isometries}} * '''Classification theorem of surfaces'''▼ ** [[Platonic solid#Classification\|Classification of ~~two-dimensional closed~~Platonic ~~manifolds~~solids]] ▲* ~~'''~~Classification ~~theorem~~theorems of surfaces~~'''~~ [[Enriques-Kodaira classification]] of [[algebraic surfaces]] (complex dimension two, real dimension four)▼ {{annotated link\|Classification of two-dimensional closed manifolds}} [[Nielsen-Thurston classification]] which characterizes homeomorphisms of a compact surface▼ ▲ ~~[[Enriques-Kodaira~~{{annotated link\|Enriques–Kodaira classification]]}} of [[algebraic surfaces]] (complex dimension two, real dimension four) * Thurston's eight model geometries, and the [[geometrization conjecture]]▼ ▲** ~~[[Nielsen-Thurston~~{{annotated link\|Nielsen–Thurston classification]]}} which characterizes homeomorphisms of a compact surface ▲* Thurston's eight model geometries, and the [[{{annotated link\|geometrization conjecture]]}} * {{annotated link\|Holonomy#The Berger classification\|Berger classification}} * {{annotated link\|Symmetric space#Classification result\|Classification of Riemannian symmetric spaces}} * {{annotated link\|Lens space#Classification of 3-dimensional lens spaces\|Classification of 3-dimensional lens spaces}} * {{annotated link\|Classification of manifolds}} ==Algebra== * [[{{annotated link\|Classification of finite simple groups]]}} ** {{annotated link\|Abelian group#Classification\|Classification of Abelian groups}} * [[Artin–Wedderburn theorem]] — a classification theorem for semisimple rings ▼ {{annotated link\|Finitely generated abelian group#Classification\|Classification of Finitely generated abelian group}} {{annotated link\|Multiple transitivity\|Classification of Rank 3 permutation group}} ** {{annotated link\|Rank 3 permutation group#Classification\|Classification of 2-transitive permutation groups}} ▲* [[{{annotated link\|Artin–Wedderburn theorem]]}} — a classification theorem for semisimple rings * {{annotated link\|Classification of Clifford algebras}} * {{annotated link\|Classification of low-dimensional real Lie algebras}} * Classification of Simple Lie algebras and groups {{annotated link\|Semisimple Lie algebra#Classification\|Classification of simple complex Lie algebras}} {{annotated link\|Satake diagram\|Classification of simple real Lie algebras}} {{annotated link\|Simple Lie group#Full classification\|Classification of centerless simple Lie groups}} {{annotated link\|List of simple Lie groups\|Classification of simple Lie groups}} * {{annotated link\|Bianchi classification}} * {{annotated link\|ADE classification}} {{annotated link\|Langlands classification}} ==Linear algebra== [[{{annotated link\|Finite-dimensional vector space]]}}s (by dimension) * ~~[[rank-nullity~~{{annotated link\|Rank–nullity theorem]]}} (by rank and nullity) * [[{{annotated link\|Structure theorem for finitely generated modules over a principal ideal ___domain]]}} * [[{{annotated link\|Jordan normal form]]}} * {{annotated link\|Frobenius normal form}} (rational canonical form) * [[{{annotated link\|Sylvester's law of inertia]]}} ==Analysis== ~~==Complex analysis==~~ * [[{{annotated link\|Classification of ~~Fatou components]]~~discontinuities}} ==Dynamical systems== * {{annotated link\|Classification of Fatou components}} * [[Ratner's theorems#Short description\|Ratner classification theorem]] ==Mathematical physics== * {{annotated link\|Classification of electromagnetic fields}} * {{annotated link\|Petrov classification}} * {{annotated link\|Segre classification}} * {{annotated link\|Wigner's classification}} ==See also== * {{annotated link\|Representation theorem}} * {{annotated link\|Comparison theorem}} * {{annotated link\|List of manifolds}} * [[List of theorems]] ==References== {{reflist}} {{DEFAULTSORT:Classification Theorem}} [[Category:Mathematical theorems]] [[Category:Mathematical classification systems]]