Symplectic representation

In mathematical field of representation theory, a symplectic representation is a representation of a group or a Lie algebra on a symplectic vector space (V, ω) which preserves the symplectic form ω. Here ω is a nondegenerate skew symmetric bilinear form ω : V × V → F {\displaystyle \omega \colon V\times V\to \mathbb {F} } where F is the field of scalars.

Source: Wikipedia — Symplectic representation (CC BY-SA 4.0)

Symplectic representation

In mathematical field of representation theory, a symplectic representation is a representation of a group or a Lie algebra on a symplectic vector space (V, ω) which preserves the symplectic form ω. Here ω is a nondegenerate skew symmetric bilinear form ω : V × V → F {\displaystyle \omega \colon V\times V\to \mathbb {F} } where F is the field of scalars.

This neuron ends here.

Source: Wikipedia "Symplectic representation" · CC BY-SA 4.0

Share this article: X · Bluesky
Privacy Policy