semiunit
In mathematics, the term semiunit is used in several contexts to denote an element that is in a sense nearly invertible, relative to a chosen ideal or quotient. There is no single universal definition; the precise meaning is selected to suit a particular algebraic framework.
Definition (general): Let R be a ring and I an ideal of R. An element a in
- If I is the Jacobson radical J(R), then a is a semiunit modulo J(R) exactly when its
- In the familiar setting R = Z and I = pZ for a prime p, an integer a is
- Semiunits capture the idea of lifting invertibility from a quotient back to the ambient ring, a
- They relate to units and to the structure of quotient rings, radicals, and localizations. The concept
See also: units, Jacobson radical, radicals, Hensel’s lemma, lifting invertibility.
Note: The term is not fixed to a single standard definition, so readers may encounter variant formulations