Moduli Spaces Two Riemann surfaces of the same topological type can, of course, be conformally inequivalent; but how many conformal structures are there, and how can one deform them ? Take for example an annulus A(r, R)

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Date: 2011-02-14 06:36:11 Moduli theory Riemann surfaces Differential geometry Geometric topology Quantum field theory Moduli space Mapping class group Conformal geometry Moduli Teichmller space Moduli stack of formal group laws		Moduli Spaces Two Riemann surfaces of the same topological type can, of course, be conformally inequivalent; but how many conformal structures are there, and how can one deform them ? Take for example an annulus A(r, R) Add to Reading List Source URL: www.math.uni-bonn.de Download Document from Source Website File Size: 48,22 KB Share Document on Facebook

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