论文信息 - Natural models of ackermann's set theory

Natural models of ackermann's set theory

In 1956 W. Ackermann proposed a new axiomatic set theory, that has received some attention in recent years. (See references [3], [4], [6], [7], and [9].) This theory distinguishes between sets and classes. In this paper we study mainly the natural models of this theory. We show, among other results, that the set-theoretical fragment of these models are also models of Zermelo-Fraenkel set theory. This result gives a partial answer to the question, raised by A. Levy, of the relative strength of Ackermann's set theory with respect of Zermelo-Fraenkel's.2

Rudolf Grewe | R. Grewe

[1] A. Levy,et al. Principles of partial reflection in the set theories of Zermelo and Ackermann , 1961 .

[2] Azriel Levy,et al. On Ackermann's set theory , 1959, Journal of Symbolic Logic.

[3] Wilhelm Ackermann,et al. Zur Axiomatik der Mengenlehre , 1956 .

[4] Hao Wang,et al. A survey of mathematical logic , 1963 .

[5] R. Montague,et al. Natural models of set theories , 1959 .

[6] A. Tarski,et al. Arithmetical extensions of relational systems , 1958 .