Prime ring
In abstract algebra, a nonzero ring R is a prime ring if for any two elements a and b of R, arb = 0 for all r in R implies that either a = 0 or b = 0. This definition can be regarded as a simultaneous generalization of both integral domains and simple rings.
Prime ring can also refer to the subring of a field determined by its characteristic. For a characteristic 0 field, the prime ring is the integers, for a characteristic p field (with p a prime number) the prime ring is the finite field of order p (cf. prime field).[1]
Equivalent definitions
A ring R is prime if and only if the zero ideal {0} is a prime ideal in the noncommutative sense.
This being the case, the equivalent conditions for prime ideals yield the following equivalent conditions for R to be a prime ring:
- For any two ideals A and B of R, AB={0} implies A={0} or B={0}.
- For any two right ideals A and B of R, AB={0} implies A={0} or B={0}.
- For any two left ideals A and B of R, AB={0} implies A={0} or B={0}.
Using these conditions it can be checked that the following are equivalent to R being a prime ring:
- All right ideals are faithful modules as right R modules.
- All left ideals are faithful left R modules.
Examples
- Any domain is a prime ring.
- Any simple ring is a prime ring, and more generally: every left or right primitive ring is a prime ring.
- Any matrix ring over an integral domain is a prime ring. In particular, the ring of 2-by-2 integer matrices is a prime ring.
Properties
- A commutative ring is a prime ring if and only if it is an integral domain.
- A ring is prime if and only if its zero ideal is a prime ideal.
- A nonzero ring is prime if and only if the monoid of its ideals lacks zero divisors.
- The ring of matrices over a prime ring is again a prime ring.
Notes
- ↑ Page 90 of Lua error in package.lua at line 80: module 'strict' not found.
References
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