| 1. | The relationship between real differentiability and complex differentiability is the following.
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| 2. | The relationship between real differentiability and complex differentiability is the following.
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| 3. | Stronger statement than differentiability can be made regarding the resolvent map.
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| 4. | To abandon the hypothesis of differentiability does not mean abandoning differentiability.
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| 5. | To abandon the hypothesis of differentiability does not mean abandoning differentiability.
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| 6. | Continuous G�teaux differentiability may be defined in two inequivalent ways.
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| 7. | Tangents to curves in spaces and differentiability are not in the syllabus.
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| 8. | The isomorphisms in this case are bijections with the chosen degree of differentiability.
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| 9. | Abandoning differentiability doesn't mean abandoning differential equations.
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| 10. | Besides, it is not clear if you mean real or complex differentiability.
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