R
- a ringpublic interface Ring<R> extends AbelianGroup<R>, Monoid<R>
+ : R × R → R
and
⋅ : R × R → R
To qualify as a ring, the set and two operations, (R, +, ⋅), must satisfy the requirements known as the ring axioms.Copyright © 2010-2020 NM FinTech Ltd.. All Rights Reserved.