References
-
[Bar88]
-
Robert Barnhart.
Chambers Dictionary of Etymology.
1988.
- [Bar92]
-
Henk Barendregt.
Lambda calculi with types.
In Samson Abramsky et al., editors, Handbook of Logic in
Computer Science, volume 2, pages 117–309. Oxford University Press, 1992.
- [Ber78]
-
Gérard Berry.
Stable models of typed λ-calculi.
In International Colloquium on Automata, Languages and
Programming, Lecture Notes in Computer Science, pages 72–89.
Springer-Verlag, 1978.
- [BFS03]
-
Anna Bucalo, Carsten Führmann, and Alex Simpson.
An equational notion of lifting monad.
Theoretical Computer Science, 294:31–60, 2003.
- [Bou66]
-
Nicolas Bourbaki.
Topologie Générale.
Hermann, 1966.
English translation, “General Topology”, distrubuted by
Springer-Verlag (1989).
- [BP80]
-
Michael Barr and Robert Paré.
Molecular toposes.
Journal of Pure and Applied Algebra, 17:127–132, 1980.
- [BR98]
-
Anna Bucalo and Giuseppe Rosolini.
Repleteness and the associated sheaf.
Journal of Pure and Applied Algebra, 127:147–151, 1998.
- [BW85]
-
Michael Barr and Charles Wells.
Toposes, Triples, and Theories.
Springer-Verlag, Berlin, Germany, Heidelberg, Germany, London, UK
etc., 1985.
- [CLW93]
-
Aurelio Carboni, Steve Lack, and Robert Walters.
Introduction to extensive and distributive categories.
Journal of Pure and Applied Algebra, 84:145–158, 1993.
- [Coc93]
-
J. Robin B. Cockett.
Introduction to distributive categories.
Mathematical Structures in Computer Science, 3:277–307, 1993.
- [CW87]
-
Aurelio Carboni and Robert Walters.
Cartesian bicategories. I.
Journal of Pure and Applied Algebra, 49(1–2):11–32, 1987.
- [DP86]
-
Eduardo Dubuc and Jacques Penon.
Objets compacts dans les topos.
Journal of the Australian Mathematical Society Series A,
40:203–217, 1986.
- [Esc99]
-
Martín Escardó.
On the compact regular coreflection of a stable compact locale.
In Proceedings of the 15th conference on Mathematical
Foundations of Programming Semantics (MFPS XV), volume 20 of Electronic
Notes in Theoretical Computer Science. Elsevier, 1999.
- [Esc04]
-
Martín Escardó.
Synthetic topology of data types and classical spaces.
Electronic Notes in Theoretical Computer Science, 87:21–156,
2004.
- [FR97]
-
Marcelo Fiore and Giuseppe Rosolini.
Two models of synthetic domain theory.
Journal of Pure and Applied Algebra, 116:151–162, 1997.
- [Fre66a]
-
Peter Freyd.
Algebra-valued functors in general and tensor products in particular.
Colloq. Math., 14:89–106, 1966.
- [Fre66b]
-
Peter J. Freyd.
The theory of functors and models.
In Theory of Models — Proceedings of the 1963 International
Symposium at Berkeley, pages 107–120. North Holland, 1966.
- [FS90]
-
Peter Freyd and Andre Scedrov.
Categories, Allegories, volume 39 of North-Holland
Mathematical Library.
North-Holland, Amsterdam, 1990.
- [FW90]
-
Barry Fawcett and Richard Wood.
Completely distributive lattices I.
Mathematical Proceedings of the Cambridge Philosophical
Society, 107:81–9, 1990.
- [GHK++80]
-
Gerhard Gierz, Karl Heinrich Hofmann, Klaus Keimel, Jimmie D. Lawson, Michael
Mislove, and Dana S. Scott.
A Compendium of Continuous Lattices.
Springer-Verlag, 1980.
Second edition, Continuous Lattices and Domains, published by
Cambridge University Press, 2003.
- [Hau14]
-
Felix Hausdorff.
Grundzüge der Mengenlehre.
1914.
Chapters 7–9 of the first edition contain the material on topology,
which was removed from later editions. Reprinted by Chelsea, 1949 and 1965;
there is apparently no English translation.
- [Hyl91]
-
J. Martin E. Hyland.
First steps in synthetic domain theory.
In Aurelio Carboni, Maria-Cristina Pedicchio, and Giuseppe Rosolini,
editors, Proceedings of the 1990 Como Category Conference, number 1488
in Lecture Notes in Mathematics, pages 131–156. Springer-Verlag, 1991.
- [Hyl10]
-
Martin Hyland.
Some reasons for generalising domain theory.
Mathematical Structures in Computer Science, 20(02):239–265,
2010.
- [JM07]
-
Achim Jung and Andrew Moshier.
A Hofmann-=Mislove theorem for bitopological spaces.
Electronic Notes in Theoretical Computer Science, 173:159–175,
2007.
- [Joh77]
-
Peter T. Johnstone.
Topos Theory.
Number 10 in London Mathematical Society Monographs. Academic Press,
1977.
- [Joh82]
-
Peter T. Johnstone.
Stone Spaces.
Number 3 in Cambridge Studies in Advanced Mathematics. Cambridge
University Press, 1982.
- [JT84]
-
André Joyal and Myles Tierney.
An extension of the Galois theory of Grothendieck.
Memoirs of the American Mathematical Society, 51(309), 1984.
- [KM74]
-
Anders Kock and Christian Mikkelsen.
Non-standard extensions in the theory of toposes.
In Albert Hurd and Peter Loeb, editors, Victoria Symposium on
Nonstandard Analysis, number 369 in Lecture Notes in Mathematics, pages
122–143. Springer-Verlag, 1974.
- [Koc81]
-
Anders Kock.
Synthetic Differential Geometry.
Number 51 in London Mathematical Society Lecture Notes. Cambridge
University Press, 1981.
Second edition, number 333, 2006.
- [Law71]
-
Bill Lawvere.
Quantifiers and sheaves.
In Actes du Congrès International des Mathématiciens,
volume 1, pages 329–334. Gauthier-Villars, 1971.
- [Law00]
-
Bill Lawvere.
Comments on the development of topos theory.
In Jean-Paul Pier, editor, Development of Mathematics,
1950–2000. Birkhäuser, 2000.
- [LR75]
-
Joachim Lambek and Basil Rattray.
Localizations and sheaf reflectors.
Transactions of the American Mathematical Society,
210:275–293, 1975.
- [Mac71]
-
Saunders Mac Lane.
Categories for the Working Mathematician.
Springer-Verlag, Berlin, 1971.
- [Mar47]
-
Andrei Markov.
On the representation of recursive functions.
Doklady Akademii Nauk SSSR, 58:1891–2, 1947.
- [Mik76]
-
Christian Mikkelsen.
Lattice-theoretic and Logical Aspects of Elementary Topoi.
PhD thesis, Århus Universitet, 1976.
Various publications, number 25.
- [ML84]
-
Per Martin-Löf.
Intuitionistic Type Theory.
Bibliopolis, Naples, 1984.
- [MR77]
-
Michael Makkai and Gonzalo Reyes.
First Order Categorical Logic: Model-Theoretical Methods in the
Theory of Topoi and Related Categories.
Number 611 in Lecture Notes in Mathematics. Springer-Verlag, 1977.
- [MRW02]
-
Francisco Marmolejo, Robert Rosebrugh, and Richard Wood.
A basic distributive law.
Journal of Pure and Applied Algebra, 168:209–226, 2002.
- [Par74]
-
Robert Paré.
Colimits in topoi.
Bulletin of the American Mathematical Society, 80(3):556–561,
May 1974.
- [Pho90a]
-
Wesley Phoa.
Domain Theory in Realizability Toposes.
PhD thesis, University of Cambridge, 1990.
University of Edinburgh Dept. of Computer Science report CST-82-91
and ECS-LFCS-91-171.
- [Pho90b]
-
Wesley Phoa.
Effective domains and intrinsic structure.
In Logic in Computer Science 5, pages 366–377. IEEE Computer
Society Press, 1990.
- [Ric56]
-
Henry Rice.
Recursive and recursively enumerable orders.
Transactions of the American Mathematical Society, 83:277,
1956.
- [Ros86]
-
Giuseppe Rosolini.
Continuity and Effectiveness in Topoi.
D. phil. thesis, University of Oxford, 1986.
- [RT98]
-
Giuseppe Rosolini and Paul Taylor.
Abstract stone duality in synthetic domain theory.
In preparation, 1998.
- [Sam87]
-
Giovanni Sambin.
Intuitionistic formal spaces: a first communication.
In D. Skordev, editor, Mathematical Logic and its Applications,
pages 187–204. Plenum, 1987.
- [Tay87]
-
Paul Taylor.
Homomorphisms, bilimits and saturated domains — some very basic
domain theory.
1987.
- [Tay90]
-
Paul Taylor.
An algebraic approach to stable domains.
Journal of Pure and Applied Algebra, 64:171–203, 1990.
- [Tay91]
-
Paul Taylor.
The fixed point property in synthetic domain theory.
In Gilles Kahn, editor, Logic in Computer Science 6, pages
152–160. IEEE, 1991.
- [Tay99]
-
Paul Taylor.
Practical Foundations of Mathematics.
Number 59 in Cambridge Studies in Advanced Mathematics. Cambridge
University Press, 1999.
- [Ver94]
-
Japie J. C. Vermeulen.
Proper maps of locales.
Journal of Pure and Applied Algebra, 92:79–107, 1994.
- [Vic98]
-
Steven Vickers.
Topical categories of domains.
Mathematical Structures in Computer Science, 1998.
- [Wil94]
-
Todd Wilson.
The Assembly Tower and some Categorical and Algebraic Aspects of
Frame Theory.
PhD thesis, Carnegie–Mellon University, May 1994.
- [Woo04]
-
Richard J. Wood.
Ordered sets via adjunctions.
In Maria-Cristina Pedicchio and Walter Tholen, editors, Categorical Foundations, number 97 in Encyclopedia of Mathematics and its
Applications, pages 1–47. Cambridge University Press, 2004.
The papers on abstract Stone duality may be obtained from
-
[O]
- Paul Taylor, Foundations for Computable Topology.
in Giovanni Sommaruga (ed.),
Foundational Theories of Mathematics, Kluwer 2011.
- [A]
- Paul Taylor, Sober spaces and continuations.
Theory and Applications of Categories, 10(12):248–299, 2002.
- [B]
- Paul Taylor, Subspaces in abstract Stone duality.
Theory and Applications of Categories, 10(13):300–366, 2002.
- [C]
- Paul Taylor, Geometric and higher order logic using abstract Stone duality.
Theory and Applications of Categories, 7(15):284–338, 2000.
- [D]
- Paul Taylor, Non-Artin gluing in recursion theory and lifting in abstract
Stone duality.
2000.
- [E]
- Paul Taylor, Inside every model of Abstract Stone Duality lies an Arithmetic Universe.
Electronic Notes in Theoretical Computer Science 122
(2005) 247-296.
- [F]
- Paul Taylor, Scott domains in abstract Stone duality.
March 2002.
- [G–]
- Paul Taylor, Local compactness and the Baire category theorem in abstract
Stone duality.
Electronic Notes in Theoretical Computer Science 69,
Elsevier, 2003.
- [G]
- Paul Taylor, Computably based locally compact spaces.
Logical Methods in Computer Science, 2 (2006) 1–70.
- [H–]
- Paul Taylor, An elementary theory of the category of locally compact locales.
APPSEM Workshop, Nottingham, March 2003.
- [H]
- Paul Taylor, An elementary theory of various categories of spaces and locales.
November 2004.
- [I]
- Andrej Bauer and Paul Taylor, The Dedekind reals in abstract Stone duality.
Mathematical Structures in Computer Science,
19 (2009) 757–838.
- [J]
- Paul Taylor, A λ-calculus for real analysis.
Journal of Logic and Analysis, 2(5), 1–115 (2010)
- [K]
- Paul Taylor, Interval analysis without intervals.
February 2006.
- [L]
- Paul Taylor, Tychonov’s theorem in abstract Stone duality.
September 2004.
- [N]
- Paul Taylor, Computability in locally compact spaces.
2010.
- [AA]
- Paul Taylor, Equideductive categories and their logic.
2010.
- [BB]
- Paul Taylor, An existential quantifier for topology.
2010.
- [CC]
- Paul Taylor, Cartesian closed categories with subspaces.
2009.
- [DD]
- Paul Taylor, The Phoa principle in equideductive topology.
2010.
- [EE]
- Paul Taylor, Discrete mathematics in equideductive topology.
2010.
- [FF]
- Paul Taylor, Equideductive topology.
2010.
- [GG]
- Paul Taylor, Underlying sets in equideductive topology.
2010.