![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 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](https://www.pdfsearch.io/img/8ef31c9ec1fb268ee01b8f05018bb5b2.jpg) Date: 2011-02-14 06:36:11Moduli 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 ListSource URL: www.math.uni-bonn.deDownload Document from Source Website File Size: 48,22 KBShare Document on Facebook
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