A Course Of Pure Mathematics by G. Hardy

By G. Hardy

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Iozzi, A. Wienhard: Hermitian symmetric spaces and Kähler rigidity. Transform. Groups, 12(1):5–32 (2007). M. Burger, A. Iozzi, A. Wienhard: Tight homomorphisms and Hermitian symmetric spaces. Geom. Funct. , 19(3):678–721 (2009). an extension criterion for lattice actions on the circle / 31 [8] [9] [10] [11] [12] [13] [14] [15] [16] [17] [18] [19] [20] [21] [22] [23] [24] [25] [26] [27] M. Burger, N. Monod: Continuous bounded cohomology and applications to rigidity theory. Geom. Funct. , 12(2):219–280 (2002).

Burger, N. Monod: Continuous bounded cohomology and applications to rigidity theory. Geom. Funct. , 12(2):219–280 (2002). B. Deroin, V. Kleptsyn, A. Navas: Sur la dynamique unidimensionnelle en régularité intermédiaire. , 199(2):199–262 (2007). A. Furman: Mostow-Margulis rigidity with locally compact targets. Geom. Funct. , 11(1):30–59 (2001). A. Furman: Random walks on groups and random transformations. Handbook of dynamical systems, Vol. 1A, 931–1014, North-Holland, Amsterdam, 2002. H. Furstenberg: A Poisson formula for semi-simple Lie groups.

137(1):199–231 (1999). E. Ghys: Groups acting on the circle. Enseign. Math. (2), 47(3–4):329–407 (2001). Y. Guivarc’h, A. Raugi: Products of random matrices: convergence theorems. Random matrices and their applications (Brunswick, ME, 1984), 31–54, Contemp. , 50, American Mathematical Society, Providence, RI, 1986. G. Hector, U. Hirsch: Introduction to the geometry of foliations. Part B. Foliations of codimension one. Aspects of Mathematics, E3. Friedr. Vieweg & Sohn, Braunschweig, 1983. A. Iozzi: Bounded cohomology, boundary maps, and rigidity of representations into Homeo+ (S1 ) and SU(1, n).

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