I started reading Class group after some one's advice ,so I got the following doubts,I would be happy if someone clarify the doubts,
I understood that the class group measures the failure of the Unique factorization ,here are the doubts I have got,
- What was the use of bothering(I refer to inventing) about the Unique factorization,even though i know that it was invented in the course of proving the Fermat's Last theorem by Kummer,as the Fermats equation can be splitted into the Cyclotomic fields I mean $\mathbb{Z[\omega]}$,
So are there any other applications of the ideal class group???,I mean what are the other areas that ideal class group has got its application???
- And moreover we know that the Tate-Shafarevich group is the analogue of the class group of the number field ,but when i read the Definition of the Tate-Shafarevich Group $Ш(E/K)=\mathrm{Ker}(H^1(K,E)\mapsto \prod_{v}H^1(K_v,E))$,the non-trivial elements of the Tate-Shafarevich group can be thought of as the homogeneous spaces of $A$(where $A$ is an Abelian Variety defined over $K$) that have $K_v$-rational points for every place $v$ of $K$, but no $K$-rational point. And in terms of Homogenous Spaces it is defined as $Ш(E/\mathbb{Q})=Sel(E/\mathbb{Q})/(E(\mathbb{Q})/2E(\mathbb{Q}))$,
my main question is that "The Class group on one hand measures the failure of Unique factorization ,and the Tate-Sha group on the other hand measures the extent failure of local global principle ,i mean set of homogeneous spaces with local points but no global point",
How can one relate the Tate-Sha group that measures failure of Hasse principle to the class group that measures the failure of unique Factorization ???,to be precise,how can the Tate-sha Group and Class group can be thought as analogues??,can anyone explain the reason behind it clearly
thanks a lot,
note:Please,i have been having 2 negative votes without any comment ,
anyone who gives downvote are requested to post comments in order to rectify myself