High Quality Content by WIKIPEDIA articles! In mathematics, especially vector calculus and differential topology, a closed form is a differential form ? whose exterior derivative is zero, and an exact form is a differential form that is the exterior derivative of another differential form ?. Thus exact means in the image of d, and closed means in the kernel of d. For an exact form ?, ? = d? for some differential form ? of one-lesser degree than ?. The form ? is called a "potential form" or "primitive" for ?. Since d2 = 0, ? is not unique, but can be modified by the addition of the differential of a two-step-lower-order form. This is called gauge transformation. Because d2 = 0, any exact form is automatically closed. The question of whether every closed form is exact depends on the topology of the domain of interest. On a contractible domain, every closed form is exact by the Poincare lemma. More general questions of this kind on an arbitrary differentiable manifold are the subject of de Rham cohomology, that allows one to obtain purely topological information using differential methods.

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