Fixed Point Property And

@inproceedings{COHOMOLOGY2009FixedPP,
  title={Fixed Point Property And},
  author={BOUNDED COHOMOLOGY},
  year={2009}
}
  • BOUNDED COHOMOLOGY
  • Published 2009
Let A be a unital, commutative and finitely generated ring. We prove that if n ≥ 4, then the group G = ELn(A) has a fixed point property for affine isometric actions on B. Here B stands for any L space or any Banach space isomorphic to a Hilbert space. We also verify that the comparison map Ψ : H b (G, B) → H(G, B) from bounded to ordinary cohomology is… CONTINUE READING