Convergence in relational structures

1. Arnold, B. H.: Birkhoff's Problem 20. Ann. of Math.54, 320–324 (1951).

   Google Scholar 

2. Birkhoff, G.: Moore-Smith convergence in general topology. Ann. of Math.38, 39–56 (1937).

   Google Scholar 

3. -- Lattice theory, 3^rd Edition. Amer. Math. Soc. Colloq. Publ. #25, Providence, 1967.

4. Bruns, G., Schmidt, J.: Zur Äquivalenz von Moore-Smith Folgen und Filtern. Math. Nachr.13, 169–186 (1955).

   Google Scholar 

5. Cartan, H.: Théorie des Filtres; Filtres et Ultrafiltres. C. R. Acad. Sci. Paris205, 595–598 and 777–779 (1937).

   Google Scholar 

6. Choquet, G.: Convergences. Ann. Univ. Grenoble. Sér. Sci.23, 57–112 (1948).

   Google Scholar 

7. Cohn, P. M.: Universal algebra. New York: Harper & Row 1965.

   Google Scholar 

8. Dudley, R. M.: On sequential convergence. Amer. Math. Soc. Trans.112, 483–507 (1964).

   Google Scholar 

9. Fischer, H.: Limesräume. Math. Ann.137, 269–303 (1959).

   Google Scholar 

10. Fréchet, M.: Sur quelques points du calcul fonctionnel. Rend. Circ. Math. Palermo22, 4–73 (1906).

    Google Scholar 

11. Grätzer, G.: Universal algebra. Princeton: Van Nostrand 1968.

    Google Scholar 

12. —— Lakser, H.: Equationally compact semilattices. Colloq. Math.20, 27–30 (1969).

    Google Scholar 

13. Halmos, P.: Measure theory. Princeton: Van Nostrand 1950.

    Google Scholar 

14. Kelley, J.: Convergence in topology. Duke Math. J.17, 277–283 (1950).

    Google Scholar 

15. —— General topology. Princeton: Van Nostrand 1955.

    Google Scholar 

16. Kent, D.: Convergence functions and their related topologies. Fundamenta Math.54, 125–133 (1964).

    Google Scholar 

17. --The lattice of convergence functions. Symposium on Convergence Structures, U. of Oklahoma, March, 1965.

18. Kisyński, J.: Convergence du typeL. Colloq. Math.7, 205–211 (1959–60).

    Google Scholar 

19. Kuratowski, K.: Topologie. (4^e Édition), Warsaw: Państwowe Wydawnictwo Naukowe 1958.

    Google Scholar 

20. Łoś, J.: Generalized limits in algebraically compact groups. Bull. Acad. Pol. des Sci., Sér. Sci., Math., Astr. et Phys.7, 19–21 (1959).

    Google Scholar 

21. Moore, E. H.: Introduction to a form of general analysis. Amer. Math. Soc. Colloq. Publ. #2, New Haven 1910.

22. —— Smith, L. H.: A general theory of limits. Amer. J. Math.44, 102–121 (1922).

    Google Scholar 

23. Pacholski, L., Weglorz, B.: Topologically compact structures and positive formulas. Colloq. Math.19, 37–42 (1968).

    Google Scholar 

24. Robinson, A.: Introduction to model theory and to the metamathematics of algebra. Amsterdam: North-Holland 1965.

    Google Scholar 

25. Taylor, W.: Compactness and chromatic number. Fundamenta Math. (to appear).

26. Tukey, J.: Convergence and uniformity in topology. Ann. of Math. Studies #2, Princeton 1938.

27. Urysohn, P.: Sur les Classes (L) deM. Fréchet. L'Enseignement Mathématique25, 77–83 (1926).

    Google Scholar 

28. Weglorz, B.: Equationally compact algebras (I). Fundamenta Math.59, 289–298 (1966).

    Google Scholar 

Download references