References
J. Adámek, H. Herrlich and G. E. Strecker,Abstract and Concrete Categories, Wiley (New York, 1990).
G. Birkhoff, Moore-Smith convergence in general topology,Annals of Math.,38 (1937), 39–56.
N. Bourbaki,General Topology, Addison-Wesley (Reading, Massachusetts, 1966).
S. Burris and H. P. Sankappanavar,A Course in Universal Algebra, Springer-Verlag (New York, 1981).
C. L. DeMayo, Mock-realcompactness and the equational completion of countable sets,Houston J. Math.,8 (1982), 161–165.
G. A. Edgar, The class of topological spaces is equationally definable,Algebra Univ.,3 (1973), 139–146.
L. Gillman and M. Jerison,Rings of Continuous Functions, Van Nostrand (Princeton, 1960).
H. Herrlich and G. E. Strecker,Category Theory, Allyn Bacon (Boston, 1973).
E. Hewitt and K. A. Ross,Abstract Harmonic Analysis I, Springer-Verlag (Berlin, 1963).
J. L. Kelley,General Topology, Van Nostrand (Princeton, 1955).
K. Kuratowski,Topology vol. II, Academic Press (New York, 1968).
F. E. J. Linton, Some aspects of equational categories, inProceedings of the Conference on Categorical Algebra (La Jolla, 1965), ed. by S. Eilenberg et al., Springer-Verlag (New York, 1966).
S. MacLane,Categories for the Working Mathematician (Graduate Texts in Mathematics 5), Springer-Verlag (New York, 1971).
D. Petz, A characterization of the class of compact Hausdorff spaces,Studia Sci. Math. Hungar.,12 (1977), 407–408.
G. Richter, A characterization of the Stone-Čech compactification, in Categorical Topology (Proc. Prague Symp. 1988), ed. by J. Adámek and S. MacLane, World Science (Singapore, 1989).
G. Richter, Axiomatizing the category of compact Hausdorff spaces, inCategory Theory at Work, ed. by H. Herrlich and H.-E. Porst, Heldermann Verlag (Berlin, 1991).
Z. Semadeni, A simple topological proof that the underlying set functor for compact spaces is monadic, inTOPO 72 — General Topology and its Applications (Lecture Notes in Mathematics, vol. 378), Springer-Verlag (New York, 1974).
N. Weaver, Generalized varieties,Algebra Univ.,30 (1992), 27–52.
N. Weaver, Quasi-varieties of metric algebras,Algebra Univ.,33 (1995), 1–9.
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This material is based upon work supported under a National Science Foundation graduate fellowship.
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Weaver, N. The variety of CH-algebras. Acta Math Hung 69, 221–232 (1995). https://doi.org/10.1007/BF01876227
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DOI: https://doi.org/10.1007/BF01876227