Bimodule Explained

In abstract algebra, a bimodule is an abelian group that is both a left and a right module, such that the left and right multiplications are compatible. Besides appearing naturally in many parts of mathematics, bimodules play a clarifying role, in the sense that many of the relationships between left and right modules become simpler when they are expressed in terms of bimodules.

Definition

If R and S are two rings, then an R-S-bimodule is an abelian group such that:

  1. M is a left R-module and a right S-module.
  2. For all r in R, s in S and m in M: (r.m).s = r.(m.s) .

An R-R-bimodule is also known as an R-bimodule.

Examples

Further notions and facts

If M and N are R-S-bimodules, then a map is a bimodule homomorphism if it is both a homomorphism of left R-modules and of right S-modules.

An R-S-bimodule is actually the same thing as a left module over the ring, where Sop is the opposite ring of S (where the multiplication is defined with the arguments exchanged). Bimodule homomorphisms are the same as homomorphisms of left modules. Using these facts, many definitions and statements about modules can be immediately translated into definitions and statements about bimodules. For example, the category of all is abelian, and the standard isomorphism theorems are valid for bimodules. There are however some new effects in the world of bimodules, especially when it comes to the tensor product: if M is an and N is an, then the tensor product of M and N (taken over the ring S) is an in a natural fashion. This tensor product of bimodules is associative (up to a unique canonical isomorphism), and one can hence construct a category whose objects are the rings and whose morphisms are the bimodules. This is in fact a 2-category, in a canonical way – 2 morphisms between M and N are exactly bimodule homomorphisms, i.e. functions

f:MN

that satisfy

f(m+m')=f(m)+f(m')

f(r.m.s)=r.f(m).s

,for,, and . One immediately verifies the interchange law for bimodule homomorphisms, i.e.

(f'g')\circ(fg)=(f'\circf)(g'\circg)

holds whenever either (and hence the other) side of the equation is defined, and where ∘ is the usual composition of homomorphisms. In this interpretation, the category is exactly the monoidal category of with the usual tensor product over R the tensor product of the category. In particular, if R is a commutative ring, every left or right R-module is canonically an, which gives a monoidal embedding of the category into . The case that R is a field K is a motivating example of a symmetric monoidal category, in which case, the category of vector spaces over K, with the usual tensor product giving the monoidal structure, and with unit K. We also see that a monoid in is exactly an R-algebra.[1] Furthermore, if M is an and L is an, then the set of all S-module homomorphisms from M to L becomes a in a natural fashion. These statements extend to the derived functors Ext and Tor.

Profunctors can be seen as a categorical generalization of bimodules.

Note that bimodules are not at all related to bialgebras.

See also

References

Notes and References

  1. Street. Ross. Categorical and combinatorial aspects of descent theory. 20 Mar 2003. math/0303175.