Abstract Algebra Definitions

Beschreibung

Karteikarten am Abstract Algebra Definitions, erstellt von Carlos Figueroa am 05/06/2018.
Carlos Figueroa
Karteikarten von Carlos Figueroa, aktualisiert more than 1 year ago
Carlos Figueroa
Erstellt von Carlos Figueroa vor mehr als 6 Jahre
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Zusammenfassung der Ressource

Frage Antworten
Order of permutation the order of a permutation is the l.c.m. of the lengths of the cycles in its cycle decomposition.
Binary operation Associative Commutative
Stabilizer of s in G if G is a group acting on a set S and s is some fixed element of S, the stabilizer of s in G is the set
Group A group is an order pair (G, *) where G is a set and * is a binary operation on G satisfying the following axioms:
Zero divisor & Unit in R
Sylow's Theorem (formal)
Transposition (cycles)
Symmetric group on the set Omega Permutations of Omega
Third Isomorphism Theorem (groups)
Unique Factorization Domain (U.F.D)
Subgroup of G generated by A
Subring
Subgroup
Sylow Theorem
Sum, Product, Power of Ideals I
Solvable groups
Sign of sigma Even and Odd Permutations
Simple groups
Second isomorphism theorem (groups)
Relations
Quotient group or Factor group
Quotient Ring
Ring
Second Isomorphism Theorem for Rings
Presentation of G
Principal Ideal Domain (P.I.D)
Prime Ideal
Quaternion Group Q_8
P-groups & Sylow p-subgroups
Orbit of G & Transitive action
Order (element)
Norm & Positive Norm
Natural Projection (homomorphism) of G onto G/N
Normalizer of A in G
Length of a Cylce
Lattice of Subgroups of Q_8
Left and Right Cosets
Maximal Ideal
Left, Right, Two-sided Ideal
Lattice of D_8
Lagrange's Theorem
Lattice of S_3
Klein 4 Group
Lattice of D_16
Integral Domain
Kernel of a Homomorphism \rho
Kernel of an Action
Isomorphism
Irreducible, Prime, and Associate element
Homomorphism (groups)
Inner automorphism
Index of H in G
Ideal generated by A
Field
First Isomorphism Theorem (groups)
Group Action
First Isomorphism Theorem for Rings
Fourth Isomorphism Theorem (Groups)
Euclidean Domain
Division Ring
Fibers of \rho
Cycle type of \sigma & Partition of n
cyclic group
Cycle decomposition of \sigma
Conjugate (element , set) & Normal group
Conjugate (subsets)
Conjugate (elements)
Class Equation
Binary operation
Cauchy's Theorem
Cayley's Theorem
Cycle
Composition Series
Center of G
Characteristic in G
Centralizer of A in G
Alternating group
Automorphism of G
Alternating Group Example
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