Coassembly is a homotopy limit map

Abstract: We prove a claim by Williams that the coassembly map is a homotopy limit map. As an application, we show that the homotopy limit map for the coarse version of equivariant A-theory agrees with the coassembly map for bivariant Atheory that appears in the statement of the topological Riemann-Roch theorem.

“…In [MM19b] we call it A coarse G (X) in because on fixed points it only sees "coarse" G-equivalences, namely G-maps that are nonequivariant weak homotopy equivalences. On fixed points it recovers the bivariant A-theory of the fibration EG × H X −→ BH as defined by Williams, see [Wil00,MM19a]. However, A coarse G (X) does not match our expected input for the h-cobordism theorem, and this paper will focus solely on A G (X) for a G-space X.…”

The equivariant parametrized $h$-cobordism theorem, the non-manifold part

“…In [MM19b] we call it A coarse G (X) in because on fixed points it only sees "coarse" G-equivalences, namely G-maps that are nonequivariant weak homotopy equivalences. On fixed points it recovers the bivariant A-theory of the fibration EG × H X −→ BH as defined by Williams, see [Wil00,MM19a]. However, A coarse G (X) does not match our expected input for the h-cobordism theorem, and this paper will focus solely on A G (X) for a G-space X.…”

The equivariant parametrized $h$-cobordism theorem, the non-manifold part