Isomorphisms
Mar. 6th, 2002 10:12 am![[personal profile]](https://www.dreamwidth.org/img/silk/identity/user.png){kind=small}
ciphergothFor ![[livejournal.com profile]](https://www.dreamwidth.org/img/external/lj-userinfo.gif)
kitty_goth and gothslut, though others (eg ajva) may also be interested - a brief description of what I was going on about in the pub the other day. This is from "Sets and Groups", J A Green, Example 200.
In the ring R[X] of polynomials over the reals, consider the principal ideal J generated by the polynomial (X^2 + 1). Then the quotient ring R[X]/J is isomorphic to the field C of complex numbers: the map theta: C -> R[X]/J s.t. theta(a + bi) = a + bX + J is a ring-isomorphism.
kitty_goth and gothslut, though others (eg ajva) may also be interested - a brief description of what I was going on about in the pub the other day. This is from "Sets and Groups", J A Green, Example 200.In the ring R[X] of polynomials over the reals, consider the principal ideal J generated by the polynomial (X^2 + 1). Then the quotient ring R[X]/J is isomorphic to the field C of complex numbers: the map theta: C -> R[X]/J s.t. theta(a + bi) = a + bX + J is a ring-isomorphism.
![[identity profile]](https://www.dreamwidth.org/img/silk/identity/openid.png){kind=small}
rar
Date: 2002-03-06 02:40 am (UTC)That rocks.
Re: rar
Date: 2002-03-06 04:05 am (UTC)Re: rar
Date: 2002-03-06 09:59 am (UTC)no subject
Date: 2002-03-06 05:16 am (UTC)no subject
Date: 2002-03-06 09:23 am (UTC)But I like your wording better :)
C
x
no subject
Date: 2002-03-06 09:56 am (UTC)Re:
Date: 2002-03-06 10:18 am (UTC)But I am a bit weird.
P.S. Add me so I can see you on my new journal/friends page ;) goth_christine is no more.
no subject
Date: 2002-03-06 11:42 am (UTC)no subject
Date: 2002-03-06 05:36 pm (UTC)no subject
Date: 2002-03-09 07:22 am (UTC)I wonder if polynominals are related to polyamory ;p
Cat - who struggles with long divsion