- The scripts used to generate the knowledge base of - Matita can be browsed on line. + The scripts used to generate the knowledge base of + Matita can be browsed on line.
- The experimental scripts for the next major version of Matita can also be browsed on line. + (Old scripts used in the previous releases of + Matita are still available.)
The formalization has been the result of a three years long collaboration between mathematicians from the University of Padova and computer scientists from the University of - Bologna, sponsored by the University of Padova. In particular, + Bologna, funded by the University of Padova. In particular, the groups that collaborated are headed respectively by Prof. Sambin in Padua (formal topology and constructive type theory) and by Prof. Asperti in Bologna (constructive type theory and interactive @@ -71,21 +72,23 @@ adjunction between topological spaces and locales
- All the results are presented constructively and in the predicative - fragment of Matita, without any reference to choice axioms. + All the results are presented constructively and in the predicative + fragment of Matita based on the minimalist type theory + by Maietti and Sambin, where choice axioms are not valid.
- In order to reason conformtably on the previous concrete categories and + In order to reason comfortably on the previous concrete categories and functors, we also present algebraic versions of all the introduced notions, as well as categorical embedding of the concrete categories in - the algebraized ones. In particular we formalized: + the algebrized ones. In particular we formalized:The formal system λδ is a typed λ-calculus that pursues the unification of terms, types, environments and contexts @@ -164,7 +167,7 @@
- See the λδ home page + See the λδ home page for more information.