| 31. | Therefore, is a timelike vector field, while are spacelike vector fields.
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| 32. | Homothetic vector fields find application in the study of singularities in general relativity.
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| 33. | These are respectively timelike or spacelike " unit " vector fields.
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| 34. | This is the affine normal vector field, or the Blaschke normal field.
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| 35. | Near 0 the vector field equals the radial vector field pointing towards 0.
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| 36. | Near 0 the vector field equals the radial vector field pointing towards 0.
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| 37. | Are there free tools available for visualizing time-varying 3D vector fields?
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| 38. | The calculus of such vector fields is vector calculus.
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| 39. | A fundamental vector field on " P " is thus vertical.
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| 40. | The diffeomorphism group are flows with vector fields absolutely integrable in Sobolev norm:
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