Statements (18)
| Predicate | Object |
|---|---|
| gptkbp:instanceOf |
gptkb:mathematical_concept
|
| gptkbp:appliesTo |
differential forms
|
| gptkbp:expressedIn |
∫_M dω = ∫_{∂M} ω
|
| gptkbp:field |
gptkb:mathematics
vector calculus |
| gptkbp:generalizes |
gptkb:Green's_theorem
gptkb:divergence_theorem gptkb:fundamental_theorem_of_calculus |
| gptkbp:language |
gptkb:French
|
| gptkbp:namedAfter |
gptkb:George_Gabriel_Stokes
|
| gptkbp:relatedTo |
gptkb:Stokes'_theorem
|
| gptkbp:sentence |
The integral of the exterior derivative of a differential form over a manifold is equal to the integral of the form over the boundary of the manifold.
|
| gptkbp:usedIn |
differential geometry
engineering physics |
| gptkbp:bfsParent |
gptkb:Michel_Audin
|
| gptkbp:bfsLayer |
7
|
| https://www.w3.org/2000/01/rdf-schema#label |
La formule de Stokes
|