Titlebook: Lectures on Hyperbolic Geometry; Riccardo Benedetti,Carlo Petronio Textbook 1992 Springer-Verlag Berlin Heidelberg 1992 Cohomology.Flat Fi

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0172-5939 g results and also opened up new questions. The book concerns the geometry of manifolds and in particular hyperbolic manifolds; its aim is to provide an exposition of some fundamental results, and to be as far as possible self-contained, complete, detailed and unified. Since it starts from the basic

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Textbook 1992and also opened up new questions. The book concerns the geometry of manifolds and in particular hyperbolic manifolds; its aim is to provide an exposition of some fundamental results, and to be as far as possible self-contained, complete, detailed and unified. Since it starts from the basics and it r

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Hyperbolic Manifolds and the Compact Two-dimensional Case,omplete then it can be obtained as a quotient of hyperbolic space). Afterwards we shall consider the special case of compact surfaces and we shall give a complete classification of the hyperbolic structures on a surface of fixed genus (that is we shall give a parametrization of the so-called Teichmüller space).

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The Space of Hyperbolic Manifolds and the Volume Function,t such an invariant is (topologically) complete for . = 2 in the compact case, and it may be proved that in the finite-volume case it becomes complete together with the number of cusp ends (“punctures”). Hence the problem of studying the volume function arises quite naturally: this is the aim of the present chapter.

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Miodrag LovricThis is the first attempt in Statistics to engage the most recognized international authors Including the most prominent authors from many developing countries To write relatively brief papers on topi