L-theory

Algebraic L-theory is the K-theory of quadratic forms; the term was coined by C. T. C. Wall, with "L" being used as the letter after "K". Algebraic "L"-theory (also known as `hermitian "K"-theory')is very important in surgery theory.

Definition

One can define "L"-groups for any ring with involution $R$ : the quadratic "L"-groups $L_*(R)$ (Wall) and the symmetric "L"-groups $L^*(R)$ (Mishchenko, Ranicki).

The "L"-groups of a group $pi$ are the "L"-groups $L_*(mathbf{Z} [pi] )$ of the group ring $mathbf{Z} [pi]$ . In the applications to topology $pi$ is the fundamental group $pi_1 X$ of a space $X$ . The quadratic "L"-groups $L_*(mathbf{Z} [pi] )$ play a central role in the surgery classification of the homotopy types of $n$ -dimensional manifoldsof dimension $n> 4$ .

The simply connected "L"-groups are also the "L"-groups of the integers: $L(e) := L(mathbf{Z} [e] ) = L(mathbf{Z})$ with $L$ = $L^*$ or $L_*$ .For quadratic "L"-groups, these are the surgery obstructions to simply connected surgery.

The distinction between symmetric "L"-groups and quadratic "L"-groups, indicated by upper and lower indices, reflectsthe usage in group homology and cohomology. The group cohomology $H^*$ of the cyclic group $mathbf{Z}_2$ deals with the fixed points of a $mathbf{Z}_2$ -action, while the group homology $H_*$ dealswith the orbits of a $mathbf{Z}_2$ -action.

The quadratic "L"-groups: $L_n(R)$ and the symmetric "L"-groups: $L^n(R)$ are related by a symmetrization map $L_n(R) o L^n(R)$ which is an isomorphism modulo 2-torsion, and which corresponds to the polarization identities.

The quadratic "L"-groups are 4-fold periodic. The quadratic "L"-groups of the integers are:: $egin{align}L_{4k}(mathbf{Z}) &= mathbf{Z} && mbox{signature/8}\L_{4k+1}(mathbf{Z}) &= 0\L_{4k+2}(mathbf{Z}) &= mathbf{Z}/2 && mbox{Arf invariant}\L_{4k+3}(mathbf{Z}) &= 0.end{align}$

Symmetric "L"-groups are not 4-periodic in general (p. 12),though they are for the integers.The symmetric "L"-groups of the integers are:: $egin{align}L^{4k}(mathbf{Z}) &= mathbf{Z} && mbox{signature}\L^{4k+1}(mathbf{Z}) &= mathbf{Z}/2 && mbox{deRham invariant}\L^{4k+2}(mathbf{Z}) &= 0\L^{4k+3}(mathbf{Z}) &= 0.end{align}$

More generally, one can define "L"-groups for any additive category with a "chain duality", as in Ranicki (section 1).

External links

* [http://www.maths.ed.ac.uk/~aar/books/scm.pdf Surgery on compact manifolds] , by C.T.C. Wall.
* [http://www.maths.ed.ac.uk/~aar/books/topman.pdf Algebraic "L"-theory and topological manifolds] , by Andrew Ranicki.

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