Garrett 10-07-2011
1
. Commutative Algebra.
algebraic integer
: satises f () = 0, f
[x] monic
Dedekind domains: unique factorization of ideals into prime ideals
integral extension of commutative rings O/o: every r O satises
f (r ) = 0 for monic f o[x]
A
Garrett 10-05-2011
1
We will later elaborate the ideas mentioned earlier: relations
of primes to zeros of zetas, reciprocity laws, p-adic and adelic
methods. Now. Commutative Algebra: again,
algebraic integer : satises f () = 0, f [x] monic
Dedekind domai
Garrett 10-03-2011
1
We will later elaborate the ideas mentioned earlier: relations
of primes to zeros of zetas, reciprocity laws, p-adic and adelic
methods. Now. Commutative Algebra:
algebraic integer Q: satises f () = 0, f Z[x] monic
Dedekind domains: u