A *partially ordered ring* is a mathematical structure that combines the properties of a ring and a partially ordered set. To elaborate, a structure \( (R, +, \cdot) \) is called a partially ordered ring if it satisfies the following conditions: 1. **Ring Structure**: - \( (R, +) \) is an abelian group, which means that addition is commutative, associative, and each element has an additive inverse.

Ancestors (5)

  1. Ring theory
  2. Fields of abstract algebra
  3. Fields of mathematics
  4. Mathematics
  5. Home

View article source

Discussion (0)

New discussion

There are no discussions about this article yet.

Articles by others on the same topic (0)

There are currently no matching articles.
See all articles in the same topic Create my own version