In commutative algebra, a ring of mixed characteristic is a commutative ring having characteristic zero and having an ideal such that has positive characteristic.[1]
Examples
edit- The integers have characteristic zero, but for any prime number , is a finite field with elements and hence has characteristic .
- The ring of integers of any number field is of mixed characteristic
- Fix a prime p and localize the integers at the prime ideal (p). The resulting ring Z(p) has characteristic zero. It has a unique maximal ideal pZ(p), and the quotient Z(p)/pZ(p) is a finite field with p elements. In contrast to the previous example, the only possible characteristics for rings of the form Z(p) /I are zero (when I is the zero ideal) and powers of p (when I is any other non-unit ideal); it is not possible to have a quotient of any other characteristic.
- If is a non-zero prime ideal of the ring of integers of a number field , then the localization of at is likewise of mixed characteristic.
- The p-adic integers Zp for any prime p are a ring of characteristic zero. However, they have an ideal generated by the image of the prime number p under the canonical map Z → Zp. The quotient Zp/pZp is again the finite field of p elements. Zp is an example of a complete discrete valuation ring of mixed characteristic.
- The integers, the ring of integers of any number field, and any localization or completion of one of these rings is a characteristic zero Dedekind domain.
References
edit- ^ Bergman, George M.; Hausknecht, Adam O. (1996), Co-groups and co-rings in categories of associative rings, Mathematical Surveys and Monographs, vol. 45, American Mathematical Society, Providence, RI, p. 336, doi:10.1090/surv/045, ISBN 0-8218-0495-2, MR 1387111.