| 31. | The existence of pullback homomorphisms in de Rham cohomology depends on the pullback of differential forms.
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| 32. | Differential forms are an approach for describing the geometry of surfaces in a coordinate independent way.
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| 33. | It is often easier to work in differential form and then convert back to normal derivatives.
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| 34. | The paper showed that a germs of holomorphic functions, local rings, and differential forms.
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| 35. | Differential forms, the wedge product and the exterior derivative are independent of a choice of coordinates.
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| 36. | Flux is the integral of a differential form and, consequently, a de Rham cohomology class.
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| 37. | The mathematics, primarily tensor calculus and differential forms in curved spacetime, is developed as required.
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| 38. | The product of differential forms is called the exterior or wedge product and often denoted \ wedge.
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| 39. | Formally, product of differentials is the wedge product ( search for the article differential form ).
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| 40. | The work of �lie Cartan made differential forms one of the basic kinds of tensors used in mathematics.
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