| 1. | Thus there is monodromy around this loop enclosing the origin.
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| 2. | Here the monodromy group for a circuit around the origin is finite.
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| 3. | This homeomorphism is called the monodromy of the surface bundle.
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| 4. | The theorem below which states that is also called the monodromy theorem.
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| 5. | That means that the equation has nontrivial monodromy.
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| 6. | The degeneration of families of varieties with'loss'of topology, to monodromy.
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| 7. | Such paths correspond to the monodromy action.
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| 8. | In monodromy terms, the question is of identifying the cases of finite monodromy group.
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| 9. | In monodromy terms, the question is of identifying the cases of finite monodromy group.
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| 10. | In other words, the monodromy is a two dimensional linear representation of the fundamental group.
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