Categorical semantics
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− | Constructing denotational models of linear can be a tedious work. Categorical model are useful to identify the fundamental structure of these models, and thus simplify and make more abstract the elaboration of those models. |
+ | Constructing denotational models of linear can be a tedious work. Categorical semantics are useful to identify the fundamental structure of these models, and thus simplify and make more abstract the elaboration of those models. |
TODO: why categories? how to extract categorical models? etc. |
TODO: why categories? how to extract categorical models? etc. |
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− | See <ref>{{BibEntry|bibtype=book|author=MacLane, Saunders|title=Categories for the Working Mathematician|publisher=Springer Verlag|year=1971|volume=5|series=Graduate Texts in Mathematics}}</ref>for a more detailed introduction to category theory. |
+ | See <ref>{{BibEntry|bibtype=book|author=MacLane, Saunders|title=Categories for the Working Mathematician|publisher=Springer Verlag|year=1971|volume=5|series=Graduate Texts in Mathematics}}</ref>for a more detailed introduction to category theory. See <ref>{{BibEntry|bibtype=book|author=Melliès, Paul-André|title=Categorical Semantics of Linear Logic}}</ref>for a detailed treatment of categorical semantics of linear logic. |
== Modeling [[IMLL]] == |
== Modeling [[IMLL]] == |
Revision as of 19:43, 23 March 2009
Constructing denotational models of linear can be a tedious work. Categorical semantics are useful to identify the fundamental structure of these models, and thus simplify and make more abstract the elaboration of those models.
TODO: why categories? how to extract categorical models? etc.
See [1]for a more detailed introduction to category theory. See [2]for a detailed treatment of categorical semantics of linear logic.
Contents |
Modeling IMLL
A model of IMLL is a closed symmetric monoidal category. We recall the definition of these categories below.
Definition (Monoidal category)
A monoidal category is a category equipped with
- a functor called tensor product,
- an object I called unit object,
- three natural isomorphisms α, λ and ρ, called respectively associator, left unitor and right unitor, whose components are
such that
- for every objects A,B,C,D in , the diagram
commutes,
- for every objects A and B in , the diagrams
commute.
Definition (Braided, symmetric monoidal category)
A braided monoidal category is a category together with a natural isomorphism of components
called braiding, such that the two diagrams
- UNIQ2654814437515748-math-00000014-QINU
commute for every objects A, B and C.
A symmetric monoidal category is a braided monoidal category in which the braiding satisfies
for every objects A and B.
Definition (Closed monoidal category)
A monoidal category is left closed when for every object A, the functor
has a right adjoint, written
This means that there exists a bijection
which is natural in B and C. Equivalently, a monoidal category is left closed when it is equipped with a left closed structure, which consists of
- an object ,
- a morphism , called left evaluation,
for every objects A and B, such that for every morphism there exists a unique morphism making the diagram
- TODO
commute.
Dually, the monoidal category is right closed when the functor admits a right adjoint. The notion of right closed structure can be defined similarly.
In a symmetric monoidal category, a left closed structure induces a right closed structure and conversely, allowing us to simply speak of a closed symmetric monoidal category.
Modeling the additives
Definition (Product)
Definition (Monoid)
Property
Categories with products vs monoidal categories.
Modeling ILL
Introduced in[3].
Definition (Linear-non linear (LNL) adjunction)
A linear-non linear adjunction is a symmetric monoidal adjunction between lax monoidal functors
in which the category has finite products.
Modeling negation
*-autonomous categories
Definition (*-autonomous category)
Suppose that we are given a symmetric monoidal closed category and an object R of . For every object A, we define a morphism
as follows. By applying the bijection of the adjunction defining (left) closed monoidal categories to the identity morphism , we get a morphism , and thus a morphism by precomposing with the symmetry . The morphism is finally obtained by applying the bijection of the adjunction defining (left) closed monoidal categories to this morphism. The object R is called dualizing when the morphism is a bijection for every object A of . A symmetric monoidal closed category is *-autonomous when it admits such a dualizing object.
Compact closed categories
Definition (Compact closed category)
A symmetric monoidal category is compact closed when every object A has a (left) dual.
In a compact closed category the left and right duals of an object A are isomorphic.
Property
A compact closed category is monoidal closed.