Conjugate Subgroup
A Subgroup 
of an original Group 
has elements 
. Let 
be a fixed element of theoriginal Group which is not a member of . Then the transformation 
, (
, 2,...) generates a conjugate Subgroup 
. If, for all , 
, then is a Self-Conjugate (also called Invariant orNormal) Subgroup. All Subgroups of an Abelian Group areinvariant.
- Geometry
- Gergonne Line
- Gergonne Point
- Germain Primes
- Gerono Lemniscate
- Gersgorin Circle Theorem
- G-Function
- g-Function
- Ghost
- Gibbs Constant
- Gibbs Effect
- Gibbs Phenomenon
- Gigantic Prime
- Gilbrat's Distribution
- Gilbreath's Conjecture
- Gill's Method
- Gingerbreadman Map
- Girard's Spherical Excess Formula
- Girko's Circular Law
- Girth
- Giuga Number
- Giuga's Conjecture
- Giuga Sequence
- Glaisher-Kinkelin Constant
- Glide