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mathematics Mathematics is an area of knowledge that includes the topics of numbers, formulas and related structures, shapes and the spaces in which they are contained, and quantities and their changes. These topics are represented in modern mathematics ...
, ''KK''-theory is a common generalization both of
K-homology In mathematics, K-homology is a homology theory on the category of locally compact Hausdorff spaces. It classifies the elliptic pseudo-differential operators acting on the vector bundles over a space. In terms of C^*-algebras, it classifies the F ...
and
K-theory In mathematics, K-theory is, roughly speaking, the study of a ring generated by vector bundles over a topological space or scheme. In algebraic topology, it is a cohomology theory known as topological K-theory. In algebra and algebraic geometry, ...
as an additive bivariant functor on separable
C*-algebras In mathematics, specifically in functional analysis, a C∗-algebra (pronounced "C-star") is a Banach algebra together with an involution satisfying the properties of the adjoint. A particular case is that of a complex algebra ''A'' of continuous ...
. This notion was introduced by the Russian mathematician Gennadi Kasparov in 1980. It was influenced by Atiyah's concept of
Fredholm module In noncommutative geometry, a Fredholm module is a mathematical structure used to quantize the differential calculus. Such a module is, up to trivial changes, the same as the abstract elliptic operator introduced by . Definition If ''A'' is an in ...
s for the
Atiyah–Singer index theorem In differential geometry, the Atiyah–Singer index theorem, proved by Michael Atiyah and Isadore Singer (1963), states that for an elliptic differential operator on a compact manifold, the analytical index (related to the dimension of the space ...
, and the classification of
extension Extension, extend or extended may refer to: Mathematics Logic or set theory * Axiom of extensionality * Extensible cardinal * Extension (model theory) * Extension (predicate logic), the set of tuples of values that satisfy the predicate * E ...
s of
C*-algebra In mathematics, specifically in functional analysis, a C∗-algebra (pronounced "C-star") is a Banach algebra together with an involution satisfying the properties of the adjoint. A particular case is that of a complex algebra ''A'' of continuous ...
s by Lawrence G. Brown,
Ronald G. Douglas Ronald George Douglas (December 10, 1938 – February 27, 2018) was an American mathematician, best known for his work on operator theory and operator algebras. Education and career Douglas was born in Osgood, Indiana. He was an undergraduate a ...
, and Peter Arthur Fillmore in 1977. In turn, it has had great success in operator algebraic formalism toward the index theory and the classification of
nuclear C*-algebra In the mathematical field of functional analysis, a nuclear C*-algebra is a C*-algebra A such that the injective and projective C*- cross norms on A \oplus B are the same for every C*-algebra B. This property was first studied by under the name " ...
s, as it was the key to the solutions of many problems in operator K-theory, such as, for instance, the mere calculation of ''K''-groups. Furthermore, it was essential in the development of the
Baum–Connes conjecture In mathematics, specifically in operator K-theory, the Baum–Connes conjecture suggests a link between the operator K-theory, K-theory of the reduced C*-algebra of a group theory, group and the K-homology of the classifying space of proper act ...
and plays a crucial role in
noncommutative topology In mathematics, noncommutative topology is a term used for the relationship between topological and C*-algebraic concepts. The term has its origins in the Gelfand–Naimark theorem, which implies the duality of the category of locally compact Hausd ...
. ''KK''-theory was followed by a series of similar bifunctor constructions such as the ''E''-theory and the
bivariant periodic cyclic theory Many programming language type systems support subtyping. For instance, if the type is a subtype of , then an expression of type should be substitutable wherever an expression of type is used. Variance refers to how subtyping between more comp ...
, most of them having more category-theoretic flavors, or concerning another class of algebras rather than that of the separable ''C''*-algebras, or incorporating
group action In mathematics, a group action on a space is a group homomorphism of a given group into the group of transformations of the space. Similarly, a group action on a mathematical structure is a group homomorphism of a group into the automorphism ...
s.


Definition

The following definition is quite close to the one originally given by Kasparov. This is the form in which most KK-elements arise in applications. Let ''A'' and ''B'' be separable ''C''*-algebras, where ''B'' is also assumed to be σ-unital. The set of cycles is the set of triples (''H'', ρ, ''F''), where ''H'' is a countably generated graded Hilbert module over ''B'', ρ is a *-representation of ''A'' on ''H'' as even bounded operators which commute with ''B'', and ''F'' is a bounded operator on ''H'' of degree 1 which again commutes with ''B''. They are required to fulfill the condition that : , \rho(a) (F^2-1)\rho(a), (F-F^*)\rho(a) for ''a'' in ''A'' are all ''B''-compact operators. A cycle is said to be degenerate if all three expressions are 0 for all ''a''. Two cycles are said to be homologous, or homotopic, if there is a cycle between ''A'' and ''IB'', where ''IB'' denotes the ''C''*-algebra of continuous functions from ,1to ''B'', such that there is an even unitary operator from the 0-end of the homotopy to the first cycle, and a unitary operator from the 1-end of the homotopy to the second cycle. The KK-group KK(A, B) between A and B is then defined to be the set of cycles modulo homotopy. It becomes an abelian group under the direct sum operation of bimodules as the addition, and the class of the degenerate modules as its neutral element. There are various, but equivalent definitions of the KK-theory, notably the one due to
Joachim Cuntz Joachim Cuntz (born 28 September 1948 in Mannheim) is a German mathematician, currently a professor at the University of Münster. Work Joachim Cuntz has made fundamental contributions to the area of C*-algebras and to the field of noncommut ...
J. Cuntz. A new look at KK-theory. K-Theory 1 (1987), 31-51 which eliminates bimodule and 'Fredholm' operator F from the picture and puts the accent entirely on the homomorphism ρ. More precisely it can be defined as the set of homotopy classes :KK(A,B) = A, K(H) \otimes B/math>, of *-homomorphisms from the classifying algebra ''qA'' of quasi-homomorphisms to the ''C''*-algebra of compact operators of an infinite dimensional separable Hilbert space tensored with ''B''. Here, ''qA'' is defined as the kernel of the map from the ''C''*-algebraic free product ''A''*''A'' of ''A'' with itself to ''A'' defined by the identity on both factors.


Properties

When one takes the ''C''*-algebra C of the complex numbers as the first argument of ''KK'' as in ''KK''(C, ''B'') this additive group is naturally isomorphic to the ''K''0-group ''K''0(''B'') of the second argument ''B''. In the Cuntz point of view, a ''K''0-class of ''B'' is nothing but a homotopy class of *-homomorphisms from the complex numbers to the stabilization of ''B''. Similarly when one takes the algebra ''C''0(R) of the continuous functions on the real line decaying at infinity as the first argument, the obtained group ''KK''(''C''0(R), ''B'') is naturally
isomorphic In mathematics, an isomorphism is a structure-preserving mapping between two structures of the same type that can be reversed by an inverse mapping. Two mathematical structures are isomorphic if an isomorphism exists between them. The word is ...
to ''K''1(''B''). An important property of ''KK''-theory is the so-called Kasparov product, or the composition product, :KK(A,B) \times KK(B,C) \to KK(A,C), which is bilinear with respect to the additive group structures. In particular each element of ''KK''(''A'', ''B'') gives a homomorphism of ''K''*(''A'') → ''K''*(''B'') and another homomorphism ''K''*(''B'') → ''K''*(''A''). The product can be defined much more easily in the Cuntz picture given that there are natural maps from ''QA'' to ''A'', and from ''B'' to ''K''(''H'') ⊗ ''B'' which induce ''KK''-equivalences. The composition product gives a new
category Category, plural categories, may refer to: Philosophy and general uses * Categorization, categories in cognitive science, information science and generally *Category of being * ''Categories'' (Aristotle) *Category (Kant) *Categories (Peirce) * ...
\mathsf, whose objects are given by the separable ''C''*-algebras while the morphisms between them are given by elements of the corresponding KK-groups. Moreover, any *-homomorphism of ''A'' into ''B'' induces an element of ''KK''(''A'', ''B'') and this correspondence gives a functor from the original category of the separable ''C''*-algebras into \mathsf. The approximately inner automorphisms of the algebras become identity morphisms in \mathsf. This functor \mathsf \to \mathsf is universal among the split-exact, homotopy invariant and stable additive functors on the category of the separable ''C''*-algebras. Any such theory satisfies
Bott periodicity In mathematics, the Bott periodicity theorem describes a periodicity in the homotopy groups of classical groups, discovered by , which proved to be of foundational significance for much further research, in particular in K-theory of stable comple ...
in the appropriate sense since \mathsf does. The Kasparov product can be further generalized to the following form: :KK(A, B \otimes E) \times KK(B \otimes D, C) \to KK(A \otimes D, C \otimes E). It contains as special cases not only the K-theoretic
cup product In mathematics, specifically in algebraic topology, the cup product is a method of adjoining two cocycles of degree ''p'' and ''q'' to form a composite cocycle of degree ''p'' + ''q''. This defines an associative (and distributive) graded commutat ...
, but also the K-theoretic
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, cross, and slant products and the product of extensions.


Notes


References

* B. Blackadar
''Operator Algebras: Theory of C*-Algebras and Von Neumann Algebras''
Encyclopaedia of Mathematical Sciences 122, Springer (2005) * A. Connes, ''Noncommutative Geometry'', Academic Press (1994)


External links

* *{{nlab, id=E-theory K-theory C*-algebras