Blade (geometry)

In the study of geometric algebras, a $k$ -blade or a simple $k$ -vector is a generalization of the concept of scalars and vectors to include simple bivectors, trivectors, etc. Specifically, a $k$ -blade is a $k$ -vector that can be expressed as the exterior product (informally wedge product) of 1-vectors, and is of grade $k$ .

In detail:

A 0-blade is a scalar.
A 1-blade is a vector. Every vector is simple.
A 2-blade is a simple bivector. Sums of 2-blades are also bivectors, but not always simple. A 2-blade may be expressed as the wedge product of two vectors $a$ and $b$ :
$a\wedge b.$
A 3-blade is a simple trivector, that is, it may be expressed as the wedge product of three vectors $a$ , $b$ , and $c$ :
$a\wedge b\wedge c.$
In a vector space of dimension $n$ , a blade of grade $n - 1$ is called a pseudovector or an antivector.
The highest grade element in a space is called a pseudoscalar, and in a space of dimension $n$ is an $n$ -blade.
In a vector space of dimension $n$ , there are $k (n - k) + 1$ dimensions of freedom in choosing a $k$ -blade for $0 \leq k \leq n$ , of which one dimension is an overall scaling multiplier.

A vector subspace of finite dimension $k$ may be represented by the $k$ -blade formed as a wedge product of all the elements of a basis for that subspace. Indeed, a $k$ -blade is naturally equivalent to a $k$ -subspace endowed with a volume form (an alternating $k$ -multilinear scalar-valued function) normalized to take unit value on the $k$ -blade.

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