Derived Functors and Sheaf Cohomology
... Remark 6.5.17. One can also find in [BO20] a proof of Theorem 6.2.1. It uses an argument that involves the universality of a certain δ-functor -the generalization proposed by Grothendieck of the notion of derived functor, which was not discussed in this text. ...
This is an extensive survey of the techniques used to formulate generalizations of the Mittag-Leffler Theorem from complex analysis. With the techniques of the theory of differential forms, sheaves and cohomology, we are able to define the notion of a Mittag-Leffler Problem on a Riemann surface as a problem of passage of data from local to global, and discuss characterizations of contexts where these problems have solutions.
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