How would one prove that algebraic topology can never have a non self-

[Amsingh123]

contradictory set of abelian groups.

 

[jgens]

Any ideas about what? You have to provide some context here!

 

[Amsingh123]

What other context are you looking for?

 

[jgens]

Well your thread title only says "How would one prove that algebraic topology can never have a non self-" and then stops, while the body of your posts makes some mumblings about a TV show and proof, but never mentions what result you have in mind. So pretty much ANY indication about what question you're really asking would be nice.

 

[Amsingh123]

S*** sorry it must've gotten cut off. The title was supposed to read, "How would one prove that algebraic topology can never have a non self-contradictory set of abelian groups."

 

[jgens]

Alright this is a step in the right direction. What do you mean self-contradictory set of abelian groups though?

 

[Amsingh123]

Well that's the thing. I heard it and I thought that I was complete nonsense because abelian groups are just groups in which the operations are commutative. I don't have a great understanding of topology since I'm only 15, so I thought that my conclusion that it was just bs was due to my lack of understanding. But, I thought that maybe one could make sense out of it on this forum if anywhere.

 

[jgens]

Well without further clarification, the question is nonsense as it stands. So hopefully that gives you some peace of mind.

 

[DrewD]

Don't expect to learn math from the Big Bang Theory