hello

Hi.

Hey man

so for your example about the quaternions

it is true that the in the set {i, j, ij, ji}, ij and ji commute

but i and j don't commute

that is the framework of my proof

do you see what I'm talking about?

you also asked another question about my proof

Yes. That's the point. We assume that we have two non-commuting elements, and we try to deduce a contradiction using the assumption that every four-element subset contains (at least) one pair of commuting elements. It does not suffice to look only at the set {x,y,xy,yx} since there are non-abelian groups in which such a subset contains a commuting pair.

That's a response to "but i and j don't commute".

Name me one

one non-abelian group where every subset {x, y, xy, yx} contains a commuting pair.

The quaternion group.

You're right

So the question is wrong

I see where my proof is wrong as well

"proof"

You could just edit your answer to say that the quaternion group gives a counterexample. That would close the case.

Yeah

sorry

im on it

No problem. I'll then clean up the comments.

thanks

glad you make the internet a slightly better place

made*

That's what we're all here for, isn't it?

Alright its done

Thank you very much

Have a nice evening/day

Same to you.