Monodromy and vanishing cycles for complete intersection curves
We compute the topological monodromy of every family of complete intersection curves. Like in the case of plane curves previously treated by the second-named author, we find the answer is given by the $r$-spin mapping class group associated to the maximal root of the adjoint line bundle. Our main in...
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| Sprache: | eng |
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| Zusammenfassung: | We compute the topological monodromy of every family of complete intersection
curves. Like in the case of plane curves previously treated by the second-named
author, we find the answer is given by the $r$-spin mapping class group
associated to the maximal root of the adjoint line bundle. Our main innovation
is a suite of tools for studying the monodromy of sections of a tensor product
of very ample line bundles in terms of the monodromy of sections of the
factors, allowing for an induction on (multi-)degree. |
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| DOI: | 10.48550/arxiv.2408.06479 |