The Nuprl Book - from the PRL Project Next: Contents Implementing Mathematics with The Nuprl Proof Development System Draft of By the PRL Group: Computer Science Department Cornell University Ithaca, NY 14853 This research supported in part by the National Science Foundation under grant DCR83-03327. Copyright 1985 by R. L. Constable and Prentice--Hall. Copyright 1995 by Cornell University.
www.cs.cornell.edu/Info/Projects/NuPrl/book/doc.html
Nuprl Publications There are several formats used to present the papers accessible here. : A hypertext version created using latex2html. or : A downloadable PDF or PostScript version. Title links : A pointer into NCSTRL, the Networked Computer Science Technical Reports Library. Publications by Author (click here for Publications by Date) 1. Aagaard, Mark and Miriam Leeser, Verifying a Logic ...
www.cs.cornell.edu/Info/Projects/NuPrl/html/publication.html
Martin-L f Type Theory: Semantics and Proof Theory The formal system of Martin-L f Type Theory (henceforth ``Type Theory'') was developed together with its semantics and proof theory. Semantics refers here on the one hand to the inuitive informal meaning explanations developed by Martin-L f in the tradition of intuitionistic philosophy of mathematics, and on the other hand to metamathematical ...
www.cs.chalmers.se/~coquand/Sem.html
Inductive Definitions in Type Theory, 30 August - 3 September 1999 Lecturer: Peter Dybjer, room 2412, extension 1035, email: peterd Assistant: Qiao Haiyan, room 5429, extension 5410, email: qiao Room: S4 Preliminary schedule Monday 30th Tuesday 31st Wednesday 1st Thursday 2nd Friday 3rd 10.15 Lecture Lecture Lecture Lecture 11.15 Lecture Lecture Lecture Lecture 12.15 13.15 Alfa demo (CC) Lecture ...
www.cs.chalmers.se/~peterd/kurser/tt/index.html
Research area of Anton Setzer a) Area My research area combines two fascinating and difficult areas of mathematical logic, proof theory and type theory, both of which are currently undergoing a fast development. I am particularly specialised in the definition of new proof theoretically strong, predicative extensions of type theory and in carrying out proof theoretic analyses of them. Proof ...
www.math.uu.se/~setzer/research/researchprofile.html