Primordial element (algebra)

In algebra, a primordial element is a particular kind of a vector in a vector space.

Definition

Let ${\displaystyle V}$  be a vector space over a field ${\displaystyle \mathbb {F} }$  and let ${\displaystyle \left(e_{i}\right)_{i\in I}}$  be an ${\displaystyle I}$ -indexed basis of vectors for ${\displaystyle V.}$  By the definition of a basis, every vector ${\displaystyle v\in V}$  can be expressed uniquely as

$${\displaystyle v=\sum _{i\in I}a_{i}(v)e_{i}}$$

 

for some ${\displaystyle I}$ -indexed family of scalars ${\displaystyle \left(a_{i}\right)_{i\in I}}$  where all but finitely many ${\displaystyle a_{i}}$  are zero. Let

$${\displaystyle I(v)=\left\{i\in I:a_{i}(v)\neq 0\right\}}$$

 

denote the set of all indices for which the expression of ${\displaystyle v}$  has a nonzero coefficient. Given a subspace ${\displaystyle W}$  of ${\displaystyle V,}$  a nonzero vector ${\displaystyle p\in W}$  is said to be primordial if it has both of the following two properties:^[1]

1. ${\displaystyle I(p)}$  is minimal among the sets ${\displaystyle I(w),}$  where ${\displaystyle 0\neq w\in W,}$  and
2. ${\displaystyle a_{i}(p)=1}$  for some index ${\displaystyle i.}$ 

References

1. Milne, J., Class field theory course notes, updated March 23, 2013, Ch IV, §2.