| 1. | You could also describe a position by distances from three fixed points.
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| 2. | Not the least of these is the awkwardness of the fixed points.
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| 3. | So by the previous corollary ? will have a unique fixed point.
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| 4. | This example is a slightly interpretive implementation of a fixed point combinator.
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| 5. | This shows that x ^ * is the fixed point for f.
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| 6. | Recursion is enabled with the use of maximum and minimum fixed points.
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| 7. | This is used in a proof of the Brouwer fixed point theorem.
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| 8. | In the confusion that is around us, this is one fixed point.
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| 9. | Inversion corresponds to reflection around some fixed point in pitch class space.
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| 10. | In general, the two fixed points can be any two distinct points.
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