In mathematics, the Chern-Simons forms are certain secondary characteristic classes. They have been found to be of interest in gauge theory, and they (especially the 3-form) define the action of Chern-Simons theory.
Given a manifold and a Lie algebra valued 1-form, 
over it, we can define a family of p-forms:
In one dimension, the Chern-Simons 1-form is given by
![Tr[\bold{A}]](a/../upload/math/f356f6177bd0a1cf4a2c0fe837d30d08.png)
.
In three dimensions, the Chern-Simons 3-form is given by
![Tr[\bold{F}\wedge\bold{A}-\frac{1}{3}\bold{A}\wedge\bold{A}\wedge\bold{A}]](a/../upload/math/6c866cf17f8e647b3a4f6e51fb82b955.png)
.
In five dimensions, the Chern-Simons 5-form is given by
![Tr[\bold{F}\wedge\bold{F}\wedge\bold{A}-\frac{1}{2}\bold{F}\wedge\bold{A}\wedge\bold{A}\wedge\bold{A} +\frac{1}{10}\bold{A}\wedge\bold{A}\wedge\bold{A}\wedge\bold{A}\wedge\bold{A}]](a/../upload/math/50fb5bceba4d4ebe3f41fc5cf8bfa193.png)
where the curvature F is defined as
.
The general Chern-Simons form ω2k - 1 is defined in such a way that dω2k - 1 = Tr(Fk) where the wedge product is used to define Fk.
See gauge theory for more details.
In general, the Chern-Simons p-form is defined for any odd p. See gauge theory for the definitions. Its integral over a p dimensional manifold is a homotopy invariant. This value is called the Chern number.
See also Topological quantum field theory and Chiral anomaly.