Differential form

From early 20th century.

The concept was clarified chiefly by French mathematician Template:W (1869–1951). In his fundamental paper, 1899, Sur certaines expressions différentielles et le problème de Pfaff, Template:W (3), tome 16, Cartan used the (French) term expression différentielle, and in his 1922, Leçons sur les invariants intégraux, Hermann, he used the terms exterior differential form and exterior derivative.^[1]

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1. Template:Lb A completely antisymmetric tensor (of order p) that is defined on a Riemannian manifold; an expression, derived by applying a formalism to said tensor, that represents an integrand over the manifold.

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   • 2004, Ismo V. Lindell, Differential Forms in Electromagnetics, Template:W, page xiii,

     The present text attempts to serve as an introduction to the differential form formalism applicable to electromagnetic field theory. A glance at Figure 1.2 on page 18, presenting the Maxwell equations and the medium equation in terms of differential forms, gives the impression that there cannot exist a simpler way to express these equations, and so differential forms should serve as a natural language for electromagnetism.

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• The term often appears as differential ${\displaystyle p}$-form (or simply ${\displaystyle p}$-form), where ${\displaystyle p}$ is a variable representing a positive integer (the order of the tensor).

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• differential p-form

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• Differential form on Template:W
• Differential k-Form on Template:W
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