Literaturverzeichnis
R. Baer, Direct decompositions into infinitely many summands. Trans. Amer. Math. Soc.64, 519–551 (1948).
G.Birkhoff, Lattice theory. 2. Aufl., New York 1948.
G. Birkhoff andO. Frink, Representations of lattices by sets. Trans. Amer. Math. Soc.64, 299–316 (1948).
J. R. Büchi, Representation of complete lattices by sets. Portuguliae Math.11, 151–167 (1952).
K. H. Diener, Über zwei Birkhoff-Frinksche Struktursätze der allgemeinen Algebra. Arch. Math.7, 339–345 (1956).
Ph. Dwinger, Direct products in modular lattices. Nederl. Akad. Wet., Proc., Ser. A59 (= Indagationes math.18), 435–443 (1956).
Ph. Dwinger, On the axiom of Baer in distributive complete lattices. Nederl. Akad. Wet., Proc., Ser. A60 (= Indagationes math.19), 220–226 (1957).
Ph. Dwinrger, Some theorems on universal algebras. I. Nederl. Akad. Wet., Proc., Ser. A60 (= Indagationes math.19), 182–189 (1957).
Ph. Dwinger andJ. de Groot, On the axioms of Baer and Kurosh in modular lattices. Nederl. Akad. Wet., Proc., Ser. A59 (= Indagationes math.18), 596–601 (1956).
F.Maeda, Kontinuierliche Geometrien. Berlin 1958.
J. Schmidt, Über die Rolle der transfiniten Schlu\weisen in einer allgemeinen Idealtheorie. Math. Nachr.7, 165–182 (1952).
J.Schmidt, Einige grundlegende Begriffe und Sätze aus der Theorie der Hüllenoperatoren. Ber. Math.-Tagung Berlin 21–48 (1953).
J. Schmidt, Die transfiniten Operationen der Ordnungstheorie. Math. Ann.133, 439–449 (1957).
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Schmidt, J. Zu einem Axiom von BAER in Verbänden. Arch. Math 10, 104–108 (1959). https://doi.org/10.1007/BF01240770
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DOI: https://doi.org/10.1007/BF01240770