Talk:Cartesian product

I feel a link to the coproduct ${\displaystyle \coprod }$ is needed. MFH 22:20, 9 Mar 2005 (UTC)

could u explain why the cartesian product of 2 sets is an inefficient operation to perform

I think your question is not well posed. As it stands, the answer might be: Because the sets could be uncountable sets. MFH 22:11, 9 Mar 2005 (UTC)

I must say, the deck of cards example is excellent. It caused me to link to this page instead of the very abstract one on worlfram mathworld. please keep it. --User:Brendan642

I second that. In fact, I came here to make just that comment! -- uFu 15:44, 15 July 2005 (UTC)[reply]

Does anyone see any use in this: "The Cartesian product can be introduced by the familiar calendar format"? If not then I'll delete it. I think it confuses more than it helps. — Sebastian (talk) 00:28, July 13, 2005 (UTC)

I agree. Paul August ☎ 01:44, July 13, 2005 (UTC)

What abour the properties for cartesian product? commutative, asociative,..? I like the article.

I was under the impression that "cartesian product", like "abelian group", had lost its capital letter by now. We're inconsistent about it in the article. I suggest adopting the non-capitalised spelling, just because it's the one I'm more used to.

RandomP 18:47, 29 April 2006 (UTC)[reply]

I agree, though I think there should be a brief note to the effect that both conventions are commonly used. At any rate, it should definitely be consistent one way or another. dbtfz^talk 18:51, 29 April 2006 (UTC)[reply]

I already made a correction in the past and it was reverted back! It's not a matter of greater clarity. It's actually correct this way, and absolutely wrong the other! the ${\displaystyle i}$ index in the formula is generic and spans over all the sets in the collection, whereas the ${\displaystyle i_{0}}$ is a specific index belonging to the set ${\displaystyle I}$ of all indices, and relative to the particular projection we are performing. If you don't distinguish them, the whole thing is just wrong, that's it. Think about it. I'm pretty sure of what I'm saying. Work it out with a specific simple example to verify it, if you don't trust me.