PlanetMath: diagonal quadratic form

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diagonal quadratic form

(Definition)

Let $Q(\boldsymbol{x})\in k[x_1,\ldots,x_n]$ be a quadratic form over a field ( $\operatorname{char}(k)\neq 2$ ), where $\boldsymbol{x}$ is the column vector $(x_1,\ldots,x_n)^T$ . We write as

$\displaystyle Q(\boldsymbol{x})=\boldsymbol{x}^TM(Q)\boldsymbol{x},$

where is the associated $n\times n$ symmetric matrix over . We say that is a diagonal quadratic form if is a diagonal matrix.

Let's see what a diagonal quadratic form looks like. If is diagonal whose diagonal entry in cell is , then

$Q(\boldsymbol{x})=\boldsymbol{x}^T \begin{pmatrix}r_1 & \cdots & 0 \ \vdots ... ...egin{pmatrix}r_1x_1 \\ \vdots \\ r_nx_n\end{pmatrix}=r_1x_1^2+\cdots+r_nx_n^2.$

So the coefficients of for $i\neq j$ are all 0 in a diagonal quadratic form. A diagonal quadratic form is completely determined by the diagonal entries of .

Remark. Every quadratic form is equivalent to a diagonal quadratic form. On the other hand, a quadratic form may be equivalent to more than one diagonal quadratic form.

"diagonal quadratic form" is owned by CWoo.

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Other names:

canonical quadratic form

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Cross-references: coefficients, cell, diagonal, diagonal matrix, symmetric matrix, column vector, field, quadratic form
There is 1 reference to this entry.

This is version 9 of diagonal quadratic form, born on 2006-02-21, modified 2006-10-11.
Object id is 7646, canonical name is DiagonalQuadraticForm.
Accessed 1924 times total.

Classification:

AMS MSC:	15A63 (Linear and multilinear algebra; matrix theory :: Quadratic and bilinear forms, inner products)
	11E81 (Number theory :: Forms and linear algebraic groups :: Algebraic theory of quadratic forms; Witt groups and rings)
	11H55 (Number theory :: Geometry of numbers :: Quadratic forms )

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