Math Is Fun Forum
You are not logged in.
- Topics: Active | Unanswered
Pages: 1
#1 2007-09-17 09:30:24
- mamoo
- Member
- Registered: 2007-09-06
- Posts: 3
Groups and neighbourhood
can someone explain to me groups and neighbourhood. i dont understand anything.
please help
thnx
Offline
#2 2007-09-17 10:27:41
- John E. Franklin
- Member
- Registered: 2005-08-29
- Posts: 3,588
Re: Groups and neighbourhood
I don't know either, but Wiki says neighborhood is a small disk-shaped space around a point where you can wiggle and still be in the set with that point or something.
igloo myrtilles fourmis
Offline
#3 2007-09-20 05:20:32
- dannyv
- Member
- Registered: 2007-09-20
- Posts: 34
Re: Groups and neighbourhood
Group is simply a touple <A,*> where A is any set, and * is a binary operator with the following properties:
1) Asociative: for any a,b,c in A you have that (a*b)*c)=a*(b*c)
2) Neutral element: there is an element u in A where for any a in A you have that u*a=a
3) Opposite: for any element a in A there is another element called b such that b=-a
About the neighborhood I am not sure to what kind of neighbourhood you are referring to. For example in mathematical programming, a neighbourhood is simply a set of candidate solutions related to another candidate solution by means of a function called neighbourhood structure; this way defining the topology of the candidate solutions space, given an objective function.
Offline
Pages: 1