The Geometry of Darboux Integrable Elliptic Systems
Abstract
We characterize real elliptic differential systems whose solutions can be expressed in terms of holomorphic solutions to an associated holomorphic Pfaffian system H on a complex manifold. In particular, these elliptic systems arise as quotients by a group G of the real differential system generated by the real and imaginary parts of H, such that G is the real form of a complex Lie group K which is a symmetry group of H. Subject to some mild genericity assumptions, we show that such elliptic systems are characterized by a property known as Darboux integrability. Examples discussed include first- and second-order elliptic PDE and PDE systems in the plane.
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