nLab Lagrangian subspace

Redirected from "Lagrangian subspaces".

Contents

Definition

In a symplectic vector space a Lagrangian subspace is a maximal isotropic subspace:

The collection of all Lagrangian subspaces of a given space is called its Lagrangian Grassmannian.

type of subspace $W$ of inner product space	condition on orthogonal space $W^\perp$
isotropic subspace	$W \subset W^\perp$
coisotropic subspace	$W^\perp \subset W$
Lagrangian subspace	$W = W^\perp$	(for symplectic form)
symplectic space	$W \cap W^\perp = \{0\}$	(for symplectic form)

Last revised on January 2, 2015 at 19:47:20. See the history of this page for a list of all contributions to it.