Irreducible (mathematics) Guide, Meaning , Facts, Information and Description
In mathematics, the term irreducible is used in several ways.
- In abstract algebra, irreducible can be an abbreviation for irreducible element; for example an irreducible polynomial.
- In universal algebra, irreducible can refer to the inability to represent an algebraic structure as a composition of simpler structures using a product construction; for example subdirectly irreducible.
- In representation theory (group theory), an irreducible representation is a nontrivial representation with no nontrivial subrepresentations. Similarly, an irreducible module is another name for a simple module.
- In the theory of manifolds, an n-manifold is irreducible if any embedded (n-1) sphere bounds an embedded n-ball. Implicit in this definition is the use of a suitable category, such as the category of differentiable manifolds or the category of piecewise-linear manifolds.
A theorem of 3-manifold theory is: every compact, connected 3-manifold has a prime decomposition, i.e. can be written as a connected sum with each summand being prime. This prime decomposition is also unique (up to homeomorphism of summand). [Again, we must be working in either the differentiable or piecewise-linear category]
4. In algebraic geometry, an irreducible algebraic variety W is one that cannot be written as a union of subvarieties U and V, except when one of those is contained in the other.
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