| 1. | A morphism with a right inverse is called a split epimorphism.
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| 2. | Why would a left inverse be different from a right inverse?
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| 3. | An inverse which is both a left and right inverse must be unique.
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| 4. | Then for all in; that is, is a right inverse to.
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| 5. | A Green's function can also be thought of as a right inverse of.
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| 6. | A "'split monomorphism "'is an homomorphism that has a right inverse.
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| 7. | Any morphism with a right inverse is an epimorphism, but the converse is not true in general.
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| 8. | Showing that it's a right inverse is no problem, but the continuity is giving me trouble.
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| 9. | A loop has the " inverse property " if it has both the left and right inverse properties.
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| 10. | Kambites & Otto ( 2006 ) showed that it is undecidable whether an element of an automatic monoid possesses a right inverse.
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