This is a preview of subscription content, log in via an institution to check access.
Access this chapter
Tax calculation will be finalised at checkout
Purchases are for personal use only
Preview
Unable to display preview. Download preview PDF.
References
Abramsky, S. (1991a). Domain theory in logical form. Annals of Pure and Applied Logic, 51:1–77.
Abramsky, Samson (1991b). A domain equation for bisimulation. Information and Computation, 92(2):161–218.
Barr, M. and Wells, C. (1984). Toposes, Triples and Theories. Springer-Verlag. Reissued as Barr and Wells, 2005.
Barr, M. and Wells, C. (2005). Toposes, Triples and Theories. Number 12 in Reprints in Theory and Applications of Categories. Theory and Applications of Categories, Mount Allison University. Originally published as Barr and Wells, 1984.
Carboni,A., Pedicchio, M.C., and Rosolini, G., editors (1991). Category Theory-Proceedings, Como 1990, number 1488 in Lecture Notes in Mathematics. Springer-Verlag.
Coquand, T., Sambin, G., Smith, J., and Valentini, S. (2003). Inductively generated formal topologies. Annals of Pure and Applied Logic, 124:71–106.
Fourman, M.P. and Grayson, R.J. (1982). Formal spaces. In Troelstra and van Dalen, editors, The L.E.J. Brouwer Centenary Symposium, pages 107–122. North Holland.
Fourman, M.P. and Hyland, J.M.E. (1979). Sheaf models for analysis. In Four-man et al., 1979, pages 280–301.
Fourman, M.P., Mulvey, C.J., and Scott, D., editors (1979). Applications of Sheaves, number 753 in Lecture Notes in Mathematics. Springer-Verlag.
Ghilardi, Silvio (1989). Presheaf semantics and independence results for some nonclassical first-order logics. Arch. Math. Logic, 29(2):125–136.
Ghilardi, Silvio (1991). Incompleteness results in Kripke semantics. J. Symbolic Logic, 56(2):517–538.
Ghilardi, Silvio (1992). Quantified extensions of canonical propositional intermediate logics. Studia Logica, 51(2):195–214.
Gierz, G., Hofmann, K.H., Keimel, K., Lawson, J.D., Mislove, M., and Scott, D.S. (1980). A Compendium of Continuous Lattices. Springer-Verlag.
Goldblatt, Robert (1979). Topoi: The Categorial Analysis of Logic, volume 98 of Studies in Logic and the Foundations of Mathematics. North-Holland.
Goldblatt, Robert (1981). Grothendieck topology as geometric modality. Z. Math. Logik Grundlag. Math., 27(6):495–529.
Isoda, Eiko (1997). Kripke bundle semantics and C-set semantics. Studia Logica, 58(3):395–401.
Johnstone, P.T. (1982). Stone Spaces. Number 3 in Cambridge Studies in Advanced Mathematics. Cambridge University Press.
Johnstone, P.T. (1985). Vietoris locales and localic semi-lattices. In Hoffmann, R.-E., editor, Continuous Lattices and their Applications, number 101 in Pure and Applied Mathematics, pages 155–18. Marcel Dekker.
Johnstone, P.T. (2002a). Sketches of an Elephant: A Topos Theory Compendium, vol. 1. Number 44 in Oxford Logic Guides. Oxford University Press.
Johnstone, P.T. (2002b). Sketches of an Elephant: A Topos Theory Compendium, vol. 2. Number 44 in Oxford Logic Guides. Oxford University Press.
Johnstone, P.T. and Vickers, S.J. (1991). Preframe presentations present. In Carboni et al., 1991, pages 193–212.
Joyal, A. and Tierney, M. (1984). An extension of the Galois theory of Grothendieck. Memoirs of the American Mathematical Society, 309.
Lambek, J. and Scott, P.J. (1986). Introduction to Higher-Order Categorical Logic. Cambridge University Press.
Lavendhomme, R., Lucas, Th., and Reyes, G. (1989). Formal systems for topos-theoretic modalities. Bull. Soc. Math. Belg. Sér. A, 41(2):333–372.
Mac Lane, S. (1971). Categories for the Working Mathematician. Springer-Verlag.
Mac Lane, S. and Moerdijk, I. (1992). Sheaves in Geometry and Logic. Springer-Verlag.
Maietti, Maria Emilia (2003). Joyal’s arithmetic universes via type theory. In Blute, Rick and Selinger, Peter, editors, Category Theory and Computer Science (CTCS ‘02), number 69 in Electronic Notes in Theoretical Computer Science. Elsevier. doi:10.1016/S1571-0661(04)80569-3.
Makkai, M. and Reyes, G. (1995). Completeness results for intuitionistic and modal logic in a categorical setting. Ann. Pure Appl. Logic, 72(1):25–101.
McKinsey, J.C.C. and Tarski, A. (1944). The algebra of topology. Ann. of Math., 45(2):141–191.
Nagaoka, K. and Isoda, E. (1997). Incompleteness results in Kripke bundle semantics. Math. Logic Quart., 43(4):485–498.
Palmgren, Erik and Vickers, Steven (2007). Partial Horn logic and cartesian categories. Ann. Pure. Appl. Logic, 145(3):314–353.
Plotkin, G.D. (1981). Postgraduate lecture notes in advanced domain theory. Technical report, Dept of Computing Science, University of Edinburgh.
Reyes, G. and Zolfaghari, H. (1991). Topos-theoretic approaches to modality. In Carboni et al., 1991, pages 359–378.
Reyes, G. and Zolfaghari, H. (1996). Bi-Heyting algebras, toposes and modalities. J. Philos. Logic, 25(1):25–43.
Reyes, Gonzalo (1991). A topos-theoretic approach to reference and modality. Notre Dame J. Formal Logic, 32(3):359–391.
Robinson, E. (1986). Power-domains, modalities and the Vietoris monad. Technical Report 98, Computer Laboratory, University of Cambridge.
Sambin, G. (1987). Intuitionistic formal spaces—a first communication. In Skordev, Dimiter G., editor, Mathematical Logic and its Applications, pages 187–204. Plenum.
Shehtman, Valentin B. and Skvortsov, D.P. (1990). Semantics of non-classical first order predicate logics. In Petkov, P., editor, Mathematical Logic, pages 105–116. Plenum Press, New York.
Shirasu, Hiroyuki (1998). Duality in superintuitionistic and modal predicate logics. In Kracht, Marcus, de Rijke, Maarten, Wansing, Heinrich, and Zakharyaschev, Michael, editors, Advances in Modal Logic, Volume 1 (Berlin, 1996), number 87 in CSLI Lecture Notes, pages 223–236. CSLI Publications, Stanford.
Skvortsov, D. and Shehtman, V. (1993). Maximal Kripke-type semantics for modal and superintuitionistic predicate logics. Ann. Pure Appl. Logic, 63(1): 69–101.
Skvortsov, Dmitrij (1996). On finite intersections of intermediate predicate logics. In Ursini, A. and P., Agliano, editors, Logic and Algebra (Pontignano 1994), number 180 in Lect. Notes Pure Appl. Math., pages 667–688. Marcel Dekker.
Skvortsov, Dmitrij (2003). An incompleteness result for predicate extensions of intermediate propositional logics. In Balbiani, Philippe, Suzuki, Nobu-Yuki, Wolter, Frank, and Zakharyaschev, Michael, editors, Advances in Modal Logic, Volume 4, pages 461–474. King’s College Publications, London.
Smyth, M. (1978). Power domains. Journal of Computer and System Sciences, 16:23–36.
Suzuki, Nobu-Yuki (1990). Kripke bundles for intermediate predicate logics and Kripke frames for intuitionistic modal logics. Studia Logica, 49(3): 289–306.
Suzuki, Nobu-Yuki (1993). Some results on the Kripke sheaf semantics for superintuitionistic predicate logics. Studia Logica, 52(1):73–94.
Tarski, Alfred (1938). Der Aussagenkalcül und die Topologie. Fund. Math., 31:103–134.
Vickers, S.J. (1995). Locales are not pointless. In Hankin, C.L., Mackie, I.C., and Nagarajan, R., editors, Theory and Formal Methods of Computing 1994, pages 199–216, Imperial College Press. London.
Vickers, S.J. and Townsend, C.F. (2004). A universal characterization of the double powerlocale. Theoretical Computer Science, 316:297–321.
Vickers, Steven (1989). Topology via Logic. Cambridge University Press.
Vickers, Steven (1997). Constructive points of powerlocales. Math. Proc. Cam. Phil. Soc., 122:207–222.
Vickers, Steven (1999). Topical categories of domains. Mathematical Structures in Computer Science, 9:569–616.
Vickers, Steven (2001). Strongly algebraic = SFP (topically). Mathematical Structures in Computer Science, 11:717–742.
Vickers, Steven (2004). The double powerlocale and exponentiation: A case study in geometric reasoning. Theory and Applications of Categories, 12: 372–422.
Vickers, Steven (2005). Some constructive roads to Tychonoff. In Crosilla, Laura and Schuster, Peter, editors, From Sets and Types to Topology and Analysis: Towards Practicable Foundations for Constructive Mathematics, number 48 in Oxford Logic Guides, pages 223–238. Oxford University Press.
Vickers, Steven (2006). Compactness in locales and formal topology. Annals of Pure and Applied Logic, 137:413–438.
Viglas, K. (2004). Topos Aspects of the Extended Priestley Duality. PhD thesis, Department of Computing, Imperial College, London.
Wraith, G.C. (1979). Generic Galois theory of local rings. In Fourman et al., 1979, pages 739–767.
Author information
Authors and Affiliations
Editor information
Editors and Affiliations
Rights and permissions
Copyright information
© 2007 Springer
About this chapter
Cite this chapter
Vickers, S. (2007). Locales and Toposes as Spaces. In: Aiello, M., Pratt-Hartmann, I., Van Benthem, J. (eds) Handbook of Spatial Logics. Springer, Dordrecht. https://doi.org/10.1007/978-1-4020-5587-4_8
Download citation
DOI: https://doi.org/10.1007/978-1-4020-5587-4_8
Publisher Name: Springer, Dordrecht
Print ISBN: 978-1-4020-5586-7
Online ISBN: 978-1-4020-5587-4
eBook Packages: Humanities, Social Sciences and LawPhilosophy and Religion (R0)