Commutative Laws:-

Some Important Results

how can we say minimum no of elements of AUB IF N(A)=8 AND N(B)=5

Hi Sekky,
Welcome to the forum!
Thanks for the post!
I do agree, the symbol you have given is used to denote 'does not belong to'. But the one I had given is also used.
Thanks again.

Actually this list should really be in the algebra formulas thread, since a set is just a degenerate algebra.

Ricky wrote:

Sekky, this is a big world with many, many, mathematicians.  Is it really that much of a surprise that two different mathematicians don't use exactly the same symbols?

Symbols are arbitrary.  They can mean whatever you want them to.  There are standards, but different people may conform to different standards.

Actually this list should really be in the algebra formulas thread, since a set is just a degenerate algebra.

Can you please define "degenerate algebra"?  Wikipedia, MathWorld, and myself have no idea what you mean when you say that.  Also, if you're going to go with that notion, then every thread in the formula section should be put into Sets, as sets are pretty much the basis of all math.

He's using the same symbol to denote both the relation and the opposite relation, it makes no sense. The subset relation means the same back to front providing the relatives are switched, as does the less than symbol, as do any mathematical relations.

As for your query:

http://en.wikipedia.org/wiki/Algebraic_structure

and I quote: * Set: a degenerate algebraic structure having no operations.

Sets are not the "basis" of all mathematics as you put it, Sets are one of many algebraic structures, which is preciesley what algebra is: The theory of structures and relations. True that all algebraic structures have sets associated with them, but simply having a set does not base the entirety of mathematics. Morphisms, Operators, Relations ect, are not constructed from set algebras, they are associated alongside them to form more complex algebras. Hence the reason why when you strip everything away from an algebra, it becomes degenerate. Algebra is extremely fundamental yes, but it doesn't constitue everything.

Hope that clears things up for you

Morphisms, Operators, Relations ect, are not constructed from set algebras

A morphism is a mapping.  A mapping is simply a special subset of AxB, where the mapping would be from A to B.

An operator is a mapping from AxA->A, which is in turn a subset of (AxA)xA.

A relation is again a subset of AxB.

He's using the same symbol to denote both the relation and the opposite relation, it makes no sense.

That's like saying:

In my experience there are alternative notations (which often lead to confusion, but that is how the world is).

Perhaps we could include a note to that effect?

And then, sorry to say, we will need to clean up the discussion according to http://www.mathsisfun.com/forum/viewtopic.php?id=3284

Ricky wrote:

Whats a binary operator?  Intersection and union or inclusion?  Cause neither are.  A binary operator is a mapping from AxA to A.

There's no way you can be THAT naive, you're obviously doing this on purpose, either for kicks or to chase me away from the forums, but I'll humour you in any case.

Given any set, both intersection and union map P|A| x P|A| -> P|A|, hence arity of two, hence a binary operation. Except if you'd actually thought about what you were saying, you would clearly see that they're clearly binary operators because they take two parameters. Stop quoting me the set definitions of what I've already told you to be true.

Ricky wrote:

Given any set, both intersection and union map P|A| x P|A| -> P|A|

Union an intersection each take two different sets.  Not the same set, though they can be.

So you're saying any binary operator can only ever take the same element for it's operands? 2 + 3 = 5 last time I heard.

The mapping maps all elements of the set cart set to another element of the set, and they will forever be included in the power set of any given set, thusly.

Let A = {1,2,3}

P|A| = {{},{1},{2},{3},{1,2},{1,3},{2,3},{1,2,3}}

Now take the union and intersection of all possible cartesian tuples of the power set, and the yield will ALWAYS be an element of the power set, hence P|A| x P|A| -> P|A|

hence A and B are both elements of P|{1,2,3,4,5,6}| and no generality is lost, Z x Z -> Z necessarily for some Z = P|{1,2,3,4,5,6}|

Operators are associated with algebras to form more composite algebras, if I take a set, I can find an operator to form an algebra. Likewise if I find an operator and element I wish to perform, I can find a set containing them such that the operator will hold an algebra.

Last edited by Sekky (2007-02-24 12:10:43)

hence A and B are both elements of P|{1,2,3,4,5,6}|

Ah, I see.  So now we're defining union by taking the union of two sets?  And you don't see the problem in that?