Canonical Extensions of Local Systems
نویسندگان
چکیده
A local system, defined on the complement of a divisor Z ⊆ X in a complex manifold, can in general not be extended to all of X because of local monodromy. This paper describes the construction of a normal analytic space that naturally extends the étale space T of the local system, in the case when Z is a divisor with normal crossings and the local system has unipotent local monodromy.
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