Sciweavers

TLCA
2009
Springer

Algebraic Totality, towards Completeness

14 years 7 months ago
Algebraic Totality, towards Completeness
Finiteness spaces constitute a categorical model of Linear Logic whose objects can be seen as linearly topologised spaces, (a class of topological vector spaces introduced by Lefschetz in 1942) and morphisms as continuous linear maps. First, we recall definitions of finiteness spaces and describe their basic properties deduced from the general theory of linearly topologised spaces. Then we give the interpretation of LL with an algebraic approach. Second, thanks to separation properties, we can introduce an algebraic notion of totality candidate in the framework of linearly topologised spaces: a totality candidate is a closed affine subspace which does not contain 0. We show that finiteness spaces with totality candidates constitute a model of classical LL. Finally, we give a barycentric simply typed lambda-calculus, with booleans B and a conditional operator, which can be interpreted in this model. We prove completeness at type Bn → B for every n by an algebraic method.
Christine Tasson
Added 27 May 2010
Updated 27 May 2010
Type Conference
Year 2009
Where TLCA
Authors Christine Tasson
Comments (0)