Grassmannian

In mathematics, the Grassmannian $\mathbf {Gr} _{k}(V)$ (named in honour of Hermann Grassmann) is a differentiable manifold that parameterizes the set of all $k$ -dimensional linear subspaces of an $n$ -dimensional vector space $V$ over a field $K$ . For example, the Grassmannian $\mathbf {Gr} _{1}(V)$ is the space of lines through the origin in $V$ , so it is the same as the projective space $\mathbf {P} (V)$ of one dimension lower than $V$ .^[1]^[2] When $V$ is a real or complex vector space, Grassmannians are compact smooth manifolds, of dimension $k(n-k)$ .^[3] In general they have the structure of a nonsingular projective algebraic variety.

The earliest work on a non-trivial Grassmannian is due to Julius Plücker, who studied the set of projective lines in real projective 3-space, which is equivalent to $\mathbf {Gr} _{2}(\mathbf {R} ^{4})$ , parameterizing them by what are now called Plücker coordinates. (See § Plücker coordinates and Plücker relations below.) Hermann Grassmann later introduced the concept in general.

Notations for Grassmannians vary between authors, and include $\mathbf {Gr} _{k}(V)$ , $\mathbf {Gr} (k,V)$ , $\mathbf {Gr} _{k}(n)$ , $\mathbf {Gr} (k,n)$ to denote the Grassmannian of $k$ -dimensional subspaces of an $n$ -dimensional vector space $V$ .

^ Lee 2012, p. 22, Example 1.36.
^ Shafarevich 2013, p. 42, Example 1.24.
^ Milnor & Stasheff (1974), pp. 57–59.

[FOOTNOTELee201222Example_1.36-1] Lee 2012, p. 22, Example 1.36.

[FOOTNOTEShafarevich201342Example_1.24-2] Shafarevich 2013, p. 42, Example 1.24.

[3] Milnor & Stasheff (1974), pp. 57–59.

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