域,环
域
域(field)是一种代数结构(algebraic structure)。
... This may be summarized by saying: a field has two operations, the addition and the multiplication; it is an abelian group under addition, with \(0\) as additive identity; the nonzero elements form an abelian group under multiplication (with \(1\) as multiplicative identity), and the multiplication is distributive over addition.
SOURCE
数域
复数域的子域是为数域。
例子
模2域 \(\\{0,1\\}\),满足 \(0+0=0, 0 + 1 = 1, 1+1 = 0, 0\times 0 = 0, 0 \times 1 = 0, 1 \times 1 = 1\) 。
环
A ring is a set \(R\) equipped with two binary operations addition and multiplication satisfying the following three sets of axioms, called the ring axioms
- \(R\) is an abelian group under addition,
- \(R\) is a monoid(幺半群)under multiplication,
- Multiplication is distributive with respect to addition.
疑问:「整环」的英文是「integral domain」但是「环」字按理说应该跟「ring」对应,那么「domain」究竟是什么意思呢?
TO-DO:
- Euclidean Ring
