Category theory at work
Horst Herrlich and Hans-E. Porst (eds.) ; with cartoons by Marcel Erné.
Berlin : Heldermann Verlag, ©1991.
xi, 395 págs. : ilustraciones ; 24 cm.
Serie: Research and exposition in mathematics ; vol. 18
ISBN: 3885382180
Incluye referencias bibliográficas.
Reseña: MathSciNet, 92i:18001
Contenido
- H. L. Bentley, H. Herrlich and R. Lowen [Robert Lowen], Improving constructions in topology
- H. Herrlich, E. Lowen-Colebunders and F. Schwarz [Friedhelm Schwarz], Improving Top: PrTop and PsTop
- F. Schwarz [Friedhelm Schwarz] and S. Weck-Schwarz, Internal description of hulls: a unifying approach
- G. Preuss, Point separation axioms, monotopological categories and MacNeille completions
- M. Erné, The ABC of order and topology
- P. T. Johnstone, The art of pointless thinking: a student's guide to the category of locales
- H.-E. Porst and W. Tholen, Concrete dualities
- H. Herrlich, T. Mossakowski and G. E. Strecker, Algebraic $\cup$ topology
- G. Jarzembski, Free spectra of concrete categories and mixed structures
- H.-E. Porst, On the existence and structure of free topological groups
- K. H. Hofmann and S. A. Morris, Free compact groups. V. Remarks on projectivity
- G. Richter [Günther Richter], Axiomatizing the category of compact Hausdorff spaces
- E. Makai, Jr., Automorphisms and full embeddings of categories in algebra and topology
- G. Richter [Günther Richter], Algebra $\subset$ topology?!
- J. Reiterman and V. Trnková, Free structures
- H. W. Bargenda, Universal algebraic completions of right adjoint functors
- M. Sobral, Contravariant hom-functors and monadicity
- H. Röhrl, Convexity theories $\mho$---back to the future
- J. W. Gray, Products in PER: an elementary treatment of the semantics of the polymorphic lambda calculus
- L. D. Nel [Louis Daniel Nel], Nonlinear existence theorems in nonnormable analysis
- R. Börger, Fubini's theorem from a categorical viewpoint
- W. Weiss [Wolfgang Weiss], Sophus Lie's fundamental theorem
- -categorical aspects
- D. Pumplün and H. Röhrl, Convexity theories. II. The Hahn-Banach theorem for real convexity theories.