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In mathematics, the '''Farrell–Jones conjecture''',<ref>Farrell, F.T., Jones, L.E., Isomorphism conjectures in algebraic K-theory, ''J. Amer. Math. Soc.'', v. 6, pp. 249&ndash;297, 1993</ref> named after [[F. Thomas Farrell]] (now at [http://www.math.binghamton.edu/farrell/ SUNY Binghamton]) and [[Lowell Edwin Jones]] (now at [http://www.math.sunysb.edu/~lejones/ SUNY Stony Brook]) states that certain [[assembly map]]s are [[isomorphism]]s. These maps are given as certain [[homomorphism]]s.


The motivation is the interest in the target of the assembly maps; this may be, for instance, the [[algebraic K-theory]] of a [[group ring]]


:<math>K_n(RG)</math>
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or the [[L-theory]] of a group ring
 
:<math>L_n(RG)</math>,
 
where ''G'' is some [[group (mathematics)|group]].
 
The sources of the assembly maps are [[equivariant homology theory]] evaluated on the [[classifying space]] of ''G'' with respect to the family of [[virtually cyclic group|virtually cyclic subgroup]]s of ''G''. So assuming the Farrell–Jones conjecture is true, it is possible to restrict computations to virtually cyclic subgroups to get information on complicated objects such as <math>K_n(RG)</math> or <math>L_n(RG)</math>.
 
The [[Baum-Connes conjecture]] formulates a similar statement, for the [[topological K-theory]] of reduced group <math>C^*</math>-algebras <math>K^ {top}_n(C^r_*(G))</math>.
 
==Formulation==
 
One can find for any ring <math> R</math> equivariant homology theories <math>KR^?_*,LR^?_*</math> satisfying
 
: <math>KR_n^G(\{\cdot\})\cong K_n(R[G])</math> respectively <math>LR_n^G(\{\cdot\})\cong L_n(R[G]).</math>
 
Here <math>R[G]</math> denotes the [[group ring]].
 
The K-theoretic Farrell–Jones conjecture for a group ''G'' states that the map <math>p:E_{VCYC}(G)\rightarrow \{\cdot\}</math> induces an isomorphism on homology
 
:<math>KR_*^G(p):KR_*^G(E_{VCYC}(G))\rightarrow KR_*^G(\{\cdot\})\cong K_*(R[G]).</math>
 
Here <math>E_{VCYC}(G)</math> denotes the [[classifying spaces for families|classifying space]] of the group ''G'' with respect to the family of virtually cyclic subgroups, i.e. a ''G''-CW-complex whose [[isotropy group]]s are virtually cyclic and for any virtually cyclic subgroup of ''G'' the [[fixed point set]] is [[contractible]].
 
The L-theoretic Farrell–Jones conjecture is analogous.
 
== Computational aspects ==
The computation of the algebraic K-groups and the L-groups of a group ring <math>R[G]</math> is motivated by obstructions living in those groups (see for example [[Wall's finiteness obstruction]], [[surgery obstruction]], [[Whitehead torsion]]). So suppose a group <math>G</math> satisfies the Farrell–Jones conjecture for algebraic K-theory. Suppose furthermore we have already found a model <math>X</math> for the classifying space for virtually cyclic subgroups:
 
: <math> \emptyset=X^{-1}\subset X^0\subset X^1\subset \ldots \subset X </math>
 
Choose <math>G</math>-pushouts and apply the Mayer-Vietoris sequence to them:
 
: <math> KR_n^G(\coprod_{j\in I_i} G/H_j\times S^{i-1})\rightarrow KR_n^G(\coprod_{j\in I_i} G/H_j\times D^i)\oplus KR_n^G(X^{i-1})\rightarrow KR_n^G(X^i) </math><math>\rightarrow KR_{n-1}^G(\coprod_{j\in I_i} G/H_j\times S^{i-1})\rightarrow KR_{n-1}^G(\coprod_{j\in I_i} G/H_j\times D^i)\oplus KR_{n-1}^G(X^{i-1}) </math>
 
This sequence simplifies to:
 
: <math> \bigoplus_{j\in I_i}K_n(R[H_j])\oplus \bigoplus_{j\in I_i} K_{n-1}(RH_j)\rightarrow \bigoplus_{j\in I_i} K_n(RH_j)\oplus KR_n^G(X^{i-1})\rightarrow KR_n^G(X^i) </math><math>\rightarrow \bigoplus_{j\in I_i}K_{n-1}(RH_j)\oplus\bigoplus_{j\in I_i}K_{n-2}(RH_j)\rightarrow \bigoplus_{j\in I_i} K_{n-1}(RH_j)\oplus KR^G_{n-1}(X^{i-1}) </math>
 
This means that if any group satisfies a certain isomorphism conjecture one can compute its algebraic K-theory (L-theory) only by knowing the algebraic K-Theory (L-Theory) of virtually cyclic groups and by knowing a suitable model for <math> E_{VCYC}(G)</math>.
 
===Why the family of virtually cyclic subgroups ? ===
One might also try to take for example the family of finite subgroups into account. This family is much easier to handle. Consider the infinite cyclic group <math> \Z </math>. A model for <math>E_{FIN}(\Z)</math> is given by the real line <math>\R</math>, on which <math>\Z</math> acts freely by translations. Using the properties of equivariant K-theory we get
 
: <math>K_n^\Z(\R)=K_n(S^1)=K_n(pt)\oplus K_{n-1}(pt)=K_n(R)\oplus K_{n-1}(R).</math>
 
The [[Bass-Heller-Swan decomposition]] gives
 
: <math>K_n^\Z(pt)=K_n(R[\Z])\cong K_n(R)\oplus K_{n-1}(R)\oplus NK_n(R)\oplus NK_n(R).</math>
 
Indeed one checks that the assembly map is given by the canonical inclusion.
 
: <math>K_n(R)\oplus K_{n-1}(R)\hookrightarrow K_n(R)\oplus K_{n-1}(R)\oplus NK_n(R)\oplus NK_n(R)</math>
 
So it is an isomorphism if and only if <math>NK_n(R) =0</math>, which is the case if <math>R</math> is a [[regular ring]]. So in this case one can really use the family of finite subgroups. On the other hand this shows that the isomorphism conjecture for algebraic K-Theory and the family of finite subgroups is not true. One has to extend the conjecture to a larger family of subgroups which contains all the counterexamples. Currently no counterexamples for the Farrell–Jones conjecture are known. If there is a counterexample, one has to enlarge the family of subgroups to a larger family which contains that counterexample.
 
== Inheritances of isomorphism conjectures ==
The class of groups which satisfies the fibered Farrell–Jones conjecture contain the following groups
 
* virtually cyclic groups (definition)
* hyperbolic groups (see <ref>{{Citation | last1=Bartels | first1=Arthur | last2=Lück | first2 = Wolfgang | last3=Reich | first3=Holger| arxiv=math/0609685 | title=The K-theoretic Farrell-Jones Conjecture for hyperbolic groups| journal = Preprintreihe SFB 478 --- Geometrische Strukturen in der Mathematik | volume=434 | year= 2007 | place=Münster}}</ref>)
* CAT(0)-groups (see <ref>{{Citation | last1=Bartels | first1=Arthur | last2=Lück | first2 = Wolfgang | last3=Reich | first3=Holger| arxiv=0901.0442 | title=The Borel Conjecture for hyperbolic and CAT(0)-groups| journal = Preprintreihe SFB 478 --- Geometrische Strukturen in der Mathematik | volume=506 | year= 2009|place = Münster}}</ref>)
* solvable groups (see <ref>{{Citation | last1=Wegner | first1=Christian | arxiv=1308.2432 | title=The Farrell-Jones Conjecture for virtually solvable groups | year= 2013}}</ref>)
 
Furthermore the class has the following inheritance properties:
 
* closed under finite products of groups
* closed under taking subgroups.
 
== Meta-conjecture and fibered isomorphism conjectures ==
 
Fix an equivariant homology theory <math>H^?_*</math>. One could say, that a group '' G'' satisfies the isomorphism conjecture for a family of subgroups<math> F</math>, if and only if the map induced by the projection <math> E_F(G)\rightarrow \{\cdot\} </math> induces an isomorphism on homology:
 
: <math> H_*^G(E_F(G))\rightarrow H_*^G(\{\cdot\}) </math>
 
The group ''G'' satisfies the fibered isomorphism conjecture for the family of subgroups ''F'' if and only if for any group homomorphism <math> \alpha :H\rightarrow G</math> the group ''H'' satisfies the isomorphism conjecture for the family
 
: <math>\alpha^*F:=\{H'\le H|\alpha(H)\in F\}</math>.
 
One gets immediately that in this situation <math>H</math> also satisfies the fibered isomorphism conjecture for the family <math>\alpha^*F</math>.
 
===Transitivity principle===
 
The transitivity principle is a tool to change the family of subgroups to consider. Given two families <math>F\subset F'</math> of subgroups of <math> G</math>. Suppose every group <math> H\in F'</math> satisfies the (fibered) isomorphism conjecture with respect to the family <math> F|_H:=\{H'\in F|H'\subset H\}</math>.
Then the group <math>G</math> satisfies the fibered isomorphism conjecture with respect to the family <math>F</math> if and only if it satisfies the (fibered) isomorphism conjecture with respect to the family <math>F'</math>.
 
===Isomorphism conjectures and group homomorphisms===
 
Given any group homomorphism <math>\alpha:H\rightarrow G</math> and suppose that ''G"' satisfies the fibered isomorphism conjecture for a family ''F'' of subgroups. Then also ''H"' satisfies the fibered isomorphism conjecture for the family <math> \alpha^*F</math>. For example if <math> \alpha</math> has finite kernel the family <math> \alpha^*VCYC </math> agrees with the family of virtually cyclic subgroups of ''H''.
 
For suitable <math>\alpha</math> one can use the transitivity principle to reduce the family again.
 
== Connections to other conjectures==
 
===Novikov conjecture ===
 
There are also connections from the Farrell–Jones conjecture to the [[Novikov conjecture]]. It is known that if one of the following maps
 
: <math>H^G_*(E_{VCYC}(G),L^{\langle-\infty\rangle}_R)\rightarrow H^G_*(\{\cdot\},L^{\langle-\infty\rangle}_R)= L^{\langle-\infty\rangle}_*(RG)</math>
 
: <math> H^G_*(E_{FIN}(G),K^{top}) \rightarrow H^G_*(\{\cdot\},K^{top}) = K_n(C^*_r(G))</math>
 
is rationally injective then the Novikov-conjecture holds for <math>G</math>. See for example,.<ref>Ranicki, A. A., "On the Novikov conjecture", ''In Novikov conjectures , index theorems and rigidity, Vol. 1'', (Oberwolfach 2003), pp. 272–337. Cambridge Univ. Press, Cambridge.</ref><ref>Lück, W. and Reich, H, "The Baum-Connes and the Farrell-Jones conjectures in K- and L-theory", ''In Handbook of K-theory. Vol. 1,2'', pp. 703–842. Springer, Berlin, 2005.</ref>
 
===Bost conjecture ===
 
The Bost conjecture states that the assembly map
 
:<math> H^G_*(E_{FIN}(G),K^{top}_{l^1})\rightarrow H^G_*(\{\cdot\},K^{top}_{l^1})=K_*(l^1(G)) </math>
 
is an isomorphism. The ring homomorphism <math> l^1(G)\rightarrow C_r(G)</math> induces maps in K-theory <math>K_*(l^1(G))\rightarrow K_*(C_r(G))</math>. Composing the upper assembly map with this homomorphism one gets exactly the assembly map occurring in the [[Baum-Connes conjecture]].
 
:<math> H^G_*(E_{FIN}(G),K^{top}_{l^1})=H^G_*(E_{FIN}(G),K^{top})\rightarrow H^G_*(\{\cdot\},K^{top})=K_*(C_r(G))</math>
 
===Kaplansky conjecture ===
 
The Kaplansky conjecture predicts that for an integral domain <math>R</math> and a torsionfree group <math>G</math> the only idempotents in <math>R[G]</math> are <math>0,1</math>. Each such idempotent <math>p</math> gives a projective <math>R[G]</math> module by taking the image of the right multiplication with <math>p</math>. Hence there seems to be a connection between the Kaplansky conjecture and the vanishing of <math>K_0(R[G])</math>.  There are theorems relating the [[Kaplansky conjecture]] to the Farrell–Jones conjecture (compare <ref>{{Citation | doi=10.1112/jtopol/jtm008 | last1=Bartels | first1=Arthur | last2=Lück | first2=Wolfgang | last3= Reich | first3=Holger | title=On the Farrell-Jones Conjecture and its applications | arxiv=math/0703548| journal=Journal of Topology | volume=1 | year=2008 | issue=1 | pages = 57–86}}</ref>).
 
==References==
<references/>
 
{{DEFAULTSORT:Farrell-Jones Conjecture}}
[[Category:Surgery theory]]
[[Category:K-theory]]
[[Category:Conjectures]]

Latest revision as of 14:57, 15 July 2014


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