| 1. | Where v and w are vectors from the same tangent space.
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| 2. | Every point in an analytic space has a tangent space.
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| 3. | There is an associated notion of the tangent space of a measure.
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| 4. | At every point the vectors generate a tangent space of definite dimension.
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| 5. | It accepts two arguments, vectors in, the tangent space at in.
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| 6. | They provide a basis for the tangent space at.
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| 7. | The Fisher information metric is then an inner product on the tangent space.
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| 8. | The tangent space is, the dual vector space to the cotangent space.
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| 9. | See also : tangent space to a functor.
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| 10. | Involutive distributions are the tangent spaces to foliations.
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