Transcendence degree 超越次数
In abstract algebra, the transcendence degree of a field extension L /K is a certain rather coarse measure of the "size" of the extension. Specifically, it is defined as the largest cardinality of an algebraically independent subset of L over K.
A subset S of L is a transcendence basis of L /K if it is algebraically independent over K and if furthermore L is an algebraic extension of the field K(S) (the field obtained by adjoining the elements of S to K). One can show that every field extension has a transcendence basis, and that all transcendence bases have the same cardinality; this cardinality is equal to the transcendence degree of the extension and is denoted trdegK L or trdeg(L /K).
![L/K](/Images/godic/202502/17/3feced7a2dae068aab2feca41c3771964800.png")
的超越次数是 ![L](/Images/godic/202502/17/d20caec3b48a1eef164cb4ca81ba25874800.png")
中在 ![K](/Images/godic/202502/17/a5f3c6a11b03839d46af9fb43c97c1884800.png")
上代数独立子集的极大基数。![S \subset L](/Images/godic/202502/17/fce9530bfff4db9b4346d80c69ebd47a4800.png")
,使得 ![S](/Images/godic/202502/17/5dbc98dcc983a70728bd082d1a47546e4800.png")
在 ![L/K(S)](/Images/godic/202502/17/07ebb514b8615995067800f876cb10514800.png")
是代数扩张。可证明超越基存在,而任两组超越基的基数皆相同,由此可定义超越次数为超越基底的基数。