| 1. | A morphism from to is given by a continuous map with.
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| 2. | A morphism with a right inverse is called a split epimorphism.
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| 3. | Using this, we can represent any morphism as a matrix.
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| 4. | The absolute Frobenius morphism is a purely inseparable morphism of degree.
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| 5. | The absolute Frobenius morphism is a purely inseparable morphism of degree.
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| 6. | The branch points of this morphism are the circles tangent to.
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| 7. | Let be a morphism and let be an irreducible algebraic curve.
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| 8. | See flat module or, for more generality, flat morphism.
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| 9. | Let f be a morphism in a quasi-abelian category.
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| 10. | Such a function is known as a morphism from to.
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