Dual object

In category theory, a branch of mathematics, it is possible to define a concept of dual object generalizing the concept of dual space in linear algebra.

A category in which each object has a dual is called autonomous or rigid.

Definition

Consider an object ${\displaystyle X}$ in a monoidal category ${\displaystyle (\mathbf {C} ,\otimes ,I,\alpha ,\lambda ,\rho )}$. The object ${\displaystyle X^{*}}$ is called a left dual of ${\displaystyle X}$ if there exist two morphsims

${\displaystyle \eta :I\to X\otimes X^{*}}$, called the coevaluation, and ${\displaystyle \varepsilon :X^{*}\otimes X\to I}$, called the evaluation,

such that the following two diagrams commute

and

The object ${\displaystyle X}$ is called the right dual of ${\displaystyle X^{*}}$. Left duals are canonically isomorphic when they exist, as are right duals. When C is braided (or symmetric), every left dual is also a right dual, and vice versa.

If we consider a monoidal category as a bicategory with one object, a dual pair is exactly an adjoint pair.

Categories with duals

A monoidal category where every object has a left (resp. right) dual is sometimes called a left (resp. right) autonomous category. Algebraic geometers call it a left (resp. right) rigid category. A monoidal category where every object has both a left and a right dual is called an autonomous category. An autonomous category that is also symmetric is called a compact closed category.

See also

• Dualizing object

References

• Peter Freyd and David Yetter (1989). "Braided Compact Closed Categories with Applications to Low-Dimensional Topology". Advances in Mathematics. 77 (2): 156–182. doi:10.1016/0001-8708(89)90018-2.
• André Joyal and Ross Street. "The Geometry of Tensor calculus II". Synthese Lib. 259: 29–68.