Objectives I.1.a and I.1.b about the claim that via the cyclotomic trace one can prove the rational
injectivity of the K-theoretic Farrell-Jones assembly map have been completely settled and resulted in the
papers [8,9]. Actually the results of the second paper go even beyond the claim of the objectives since there
it is for instance shown that the Farrell-Jones Conjecture does not hold for topological cyclic homology.
The claims appearing in Objective I.4 about the computation of Waldhausen's non-connective A-theory for
aspherical spaces have been proved in the paper [2]. There are several sequel objectives we want to attack
using this result.
Objective III.1 about block fibering manifolds has been completely solved in the paper [3].
A lot of progress including and actually going meanwhile beyond the original Objective III.3 about identifying
THurston norms and polytopes with generalised L^2-torsion invariants has been made in the papers [1,4,5,6].
A survey on the status of the deep problems occurring in Objectives~II.1 and II.2 is given in [7].
[1] J. Dubois, S. Friedl, and W. Lück.
The L^2-Alexander torsion of 3-manifolds.
J. Topol., 9(3):889--926, 2016.
[2] N.-E. Enkelmann, W. Lück, M. Pieper, M. Ullmann, and C. Winges.
On the Farrell-Jones conjecture for Waldhausen's A-theory.
to appear in Geometry and Topology.
[3] T. Farrell, W. Lück, and W. Steimle.
Approximately fibering a manifold over an aspherical one.
Math. Ann., 370(1-2):669--726, 2018.
[4] S. Friedl and W. Lück.
The L^2-torsion function and the Thurston norm of 3-manifolds.
to appear in Commentarii Mathematici Helvetici.
[5] S. Friedl and W. Lück.
Universal L^2-torsion, polytopes and applications to 3-manifolds.
Proc. Lond. Math. Soc. (3), 114(6):1114--1151, 2017.
[6] P. Linnell and W. Lück.
Localization, Whitehead groups and the Atiyah conjecture.
Annals of K-Theory, 3(1):33--53, 2018.
[7] W. Lück.
Approximating L^2-invariants by their classical counterparts.
EMS Surv. Math. Sci., 3(2):269--344, 2016.
[8] W. Lück, H. Reich, J. Rognes, and M. Varisco.
Algebraic K-theory of group rings and the cyclotomic trace map.
Adv. Math., 304:930--1020, 2017.
[9] W. Lück, H. Reich, J. Rognes, and M. Varisco.
Assembly maps for topological cyclic homology of group algebras.
to appear in Crelle, 2016.