Difference between revisions of "Subvariety, involutive"
Ulf Rehmann (talk | contribs) m (tex encoded by computer) |
m (fixing spaces) |
||
Line 16: | Line 16: | ||
be a vector space of dimension $ 2n $ | be a vector space of dimension $ 2n $ | ||
and $ \omega $ | and $ \omega $ | ||
− | a non-degenerate alternating $ 2 $- | + | a non-degenerate alternating $ 2 $-form on it. Given a subspace $ W $ |
− | form on it. Given a subspace $ W $ | ||
of $ V $, | of $ V $, | ||
one defines (as usual) | one defines (as usual) | ||
Line 47: | Line 46: | ||
is dense in $ V $, | is dense in $ V $, | ||
then $ V $ | then $ V $ | ||
− | is involutive if and only if for every two $ C ^ {1} $- | + | is involutive if and only if for every two $ C ^ {1} $-functions $ f $, |
− | functions $ f $, | ||
$ g $ | $ g $ | ||
on $ X $ | on $ X $ | ||
which vanish on $ V $ | which vanish on $ V $ | ||
− | the Poisson bracket $ \{ f, g \} $( | + | the Poisson bracket $ \{ f, g \} $ (defined by the symplectic $ 2 $-form on $ X $) |
− | defined by the symplectic $ 2 $- | ||
− | form on $ X $) | ||
also vanishes on $ V $. | also vanishes on $ V $. | ||
====References==== | ====References==== | ||
<table><TR><TD valign="top">[a1]</TD> <TD valign="top"> P. Libermann, C.-M. Marle, "Symplectic geometry and analytical mechanics" , Reidel (1987) (Translated from French) {{MR|0882548}} {{ZBL|0643.53002}} </TD></TR></table> | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> P. Libermann, C.-M. Marle, "Symplectic geometry and analytical mechanics" , Reidel (1987) (Translated from French) {{MR|0882548}} {{ZBL|0643.53002}} </TD></TR></table> |
Latest revision as of 15:36, 11 February 2022
(in symplectic geometry)
Let $ V $ be a vector space of dimension $ 2n $ and $ \omega $ a non-degenerate alternating $ 2 $-form on it. Given a subspace $ W $ of $ V $, one defines (as usual)
$$ W ^ \perp = \{ {x \in V } : {\omega ( x, w)= 0 \textrm{ for all } w \in W } \} . $$
One says that $ W $ is an isotropic subspace if $ W \subset W ^ \perp $, that it is an involutive subspace (or co-isotropic subspace) if $ W \supset W ^ \perp $, and that it is a Lagrangian subspace if $ W = W ^ \perp $. Note that for $ W $ to be involutive it is necessary that $ \mathop{\rm dim} ( W) \geq n $.
Now, let $ V $ be a subvariety (possibly with singularities; or, more generally, an analytic subset) of a symplectic manifold $ X $. Let $ \mathop{\rm Reg} ( V) $ be the set of points of $ V $ which have a neighbourhood in $ V $ that is free of singular points. Then $ V $ is an involutive subvariety of $ X $ if for all $ p \in \mathop{\rm Reg} ( V) $ the subspace $ V _ {p} $ of $ X _ {p} $ is involutive. The notions of an isotropic subvariety and a Lagrangian subvariety are defined analogously. If $ \mathop{\rm Reg} ( V) $ is dense in $ V $, then $ V $ is involutive if and only if for every two $ C ^ {1} $-functions $ f $, $ g $ on $ X $ which vanish on $ V $ the Poisson bracket $ \{ f, g \} $ (defined by the symplectic $ 2 $-form on $ X $) also vanishes on $ V $.
References
[a1] | P. Libermann, C.-M. Marle, "Symplectic geometry and analytical mechanics" , Reidel (1987) (Translated from French) MR0882548 Zbl 0643.53002 |
Subvariety, involutive. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Subvariety,_involutive&oldid=48902