Many important functions have integral representations, and their analytic properties (first of all the ramification of analytic continuations) are determined by the monodromy of integration cycles. We demonstrate this approach on two classical problems: the Archimedes’–Newton problem on volumes of plane sections, and the sharpness problem of hyperbolic PDE’s.

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Monodromy in Integral Geometry and PDE

  • V. A. Vassiliev

摘要

Many important functions have integral representations, and their analytic properties (first of all the ramification of analytic continuations) are determined by the monodromy of integration cycles. We demonstrate this approach on two classical problems: the Archimedes’–Newton problem on volumes of plane sections, and the sharpness problem of hyperbolic PDE’s.