- #1
mathsss2
- 38
- 0
Let K be a field, \nu : K^* \rightarrow \texbb{Z} a discrete valuation on K, and R=\{x \in K^* : \nu(x) \geq 0 \} \cup \{0\} the valuation ring of \nu. For each integer k \geq 0, define A_k=\{r \in R : \nu(r) \geq k \} \cup \{0\}.
(a) Prove that for any k, A_k is a principal ideal, and that A_0 \supseteq A_1 \supseteq A_2 \supseteq\ldots
(b) Prove that if I is any nonzero ideal of R, then I=A_k for some k \geq 0.
(a) Prove that for any k, A_k is a principal ideal, and that A_0 \supseteq A_1 \supseteq A_2 \supseteq\ldots
(b) Prove that if I is any nonzero ideal of R, then I=A_k for some k \geq 0.
