nLab
quadratic form

Definition

For $V$ a vector space or $k$ -module, a quadratic form on $V$ is a function

q : V \to k

such that for all $v \in V$ , $t \in k$

q (t v) = t^{2} q (v)

and the polarization of $q$

(v, w) \mapsto q (v + w) - q (v) - q (w)

Let

⟨ -, - ⟩ : V \otimes V \to k

be a bilinear form. We say a function $q : V \to k$ is a quadratic refinement of $⟨ -, - ⟩$ if

⟨ v, w ⟩ = q (v + w) - q (v) - q (w)

for all $v, w \in V$ .

If this exists, then

⟨ v, v ⟩ = 2 q (v) .

So a quadratic refinement always exists when $2 \in k$ is invertible. Otherwise its existence is a non-trivial condition.

Course notes include for instance

Revised on June 3, 2012 21:27:44 by Urs Schreiber (131.130.246.204)