Expression de la differ\'entielle d3 de la suite spectrale de Hochishild-Serre en cohomologie born\'ee r\'eelle

Abstract

For discrete groups, we construct two bounded cohomology classes with coefficients in the second space of the reduced real 1-homology. Precisely, we associate to any discrete group G a bounded cohomology class of degree two noted g2∈ Hb2(G, H21(G, R)). For G and groups and θ : → Out(G) any homomorphism we associate a bounded cohomology class of degree three noted [θ]∈ Hb3(, H21(G, R)). When the outer homomorphism θ : → Out(G) induces an extension of G by we show that the class g2 is -invariant and that the differential d3 of Hochschild-Serre spectral sequence sends the class g2 on the class [θ] : d3(g2)=[θ]. Moreover, we show that for any integer n≥ 0 the differential d3 : E3n, 2→ E3n+3, 0 of Hochschild-Serre spectral sequence in real bounded cohomology is given as a cup-product by the class [θ].