Regular (mathematics): Difference between revisions
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{{:Regular covering}} | {{:Regular covering}} | ||
{{:Regular CW-complex}} | |||
===In differential geometry=== | ===In differential geometry=== | ||
{{:Regular value}} | {{:Regular value}} | ||
===In the theory of differential equations=== | |||
{{:Regular singular point}} | |||
===In the theory of monoids and semigroups=== | |||
{{:Regular semigroup}} | |||
===In group theory/representation theory=== | ===In group theory/representation theory=== | ||
{{:Regular group action}} | {{:Regular group action}} | ||
===In geometry=== | |||
{{:Regular polygon}} | |||
{{:Regular polyhedron}} | |||
{{:Regular polytope}} | |||
===In commutative algebra=== | |||
{{:Regular ring}} | |||
{{:Regular sequence}} | |||
{{:von Neumann-regular ring}} | |||
===In algebraic geometry=== | |||
{{:Regular map}} | |||
===In number theory=== | |||
{{:Regular prime}} | |||
===In graph theory=== | |||
{{:Regular graph}} | |||
===In axiomatic set theory=== | |||
{{:Regular cardinal}} | |||
===In measure theory=== | |||
{{:Regular measure}} | |||
===In category theory=== | |||
{{:Regular category}} | |||
Latest revision as of 22:58, 5 August 2008
In topology
Regular space: A topological space is termed regular if all points are closed sets (the assumption), and, given a point and a closed set not containing it, there are disjoint open sets containing the point and closed set respectively.
In some definitions, the assumption is skipped.
Related terms: regularity (the property of a topological space being regular)
Primary subject wiki entry: Topospaces:Regular space
Also located at: Wikipedia:Regular space, Planetmath:RegularSpace, Mathworld:RegularSpace
In differential geometry
In the theory of differential equations
In the theory of monoids and semigroups
Regular element in a semigroup: An element such that there exists satisfying .
Regular semigroup: A semigroup where every element is regular.
In group theory/representation theory
In geometry
Regular polygon: A polygon in the Euclidean plane is termed regular if all its sides have equal length and all its angles (the internal angles at its vertices) have equal measure.
No subject wiki entry.
Also located at Wikipedia:Regular polygon, Mathworld:RegularPolygon, Planetmath:RegularPolygon
In commutative algebra
In algebraic geometry
In number theory
Regular prime: A regular prime is a prime number that does not divide the class number of the cyclotomic field obtained by adjoining roots of unity to the field of rational numbers.
Pimary subject wiki entry: Number:Regular prime
Also located at Wikipedia:Regular prime, Mathworld:RegularPrime, Planetmath:RegularPrime