Published: 1977 Received: August 20, 1976Available on J-STAGE: October 20, 2006Accepted: -
Advance online publication: -
Revised: -
Correction information
Date of correction: October 20, 2006Reason for correction: -Correction: CITATIONDetails: Wrong : 1) W. Ackermann, Zur Axiomatik der Mengenlehre, Math. Ann., 131 (1956), 336-345. 2) M. Hanazawa, On replacement schemas in Ackermann's set theory, Sci. Rep. Saitama Univ., 8 (1957), 25-28. 3) M. Hanazawa, A theory of ordinal numbers with Ackermann's schema, to appear. 4) J. Lake, On an Ackermann-type set theory, J. Symbolic Logic, 38 (1973), 410-412. 5) J. Lake, Natural models and Ackermann-type set theories, J. Symbolic Logic, 40 (1975), 151-158. 6) A. Levy, On Ackermann's set theory, J. Symbolic Logic, 24 (1959), 154-166. 7) A. Levy and R.L. Vaught, Principles of partial reflection in the set theories of Zermelo and Ackermann, Pacific J. Math., 11 (1961), 1045-1062. 8) W. Reinhardt, Ackermann's set theory equals ZF, Ann. Math Logic, 2 (1970), 189-249.
Right : [1] W. Ackermann, Zur Axiomatik der Mengenlehre, Math. Ann., 131 (1956), 336-345. [2] M. Hanazawa, On replacement schemas in Ackermann's set theory, Sci. Rep. Saitama Univ., 8 (1957), 25-28. [3] M. Hanazawa, A theory of ordinal numbers with Ackermann's schema, to appear. [4] J. Lake, On an Ackermann-type set theory, J. Symbolic Logic, 38 (1973), 410-412. [5] J. Lake, Natural models and Ackermann-type set theories, J. Symbolic Logic, 40 (1975), 151-158. [6] A. Levy, On Ackermann's set theory, J. Symbolic Logic, 24 (1959), 154-166. [7] A. Levy and R. L. Vaught, Principles of partial reflection in the set theories of Zermelo and Ackermann, Pacific J. Math., 11 (1961), 1045-1062. [8] W. Reinhardt, Ackermann's set theory equals ZF, Ann. Math Logic, 2 (1970), 189-249.
Date of correction: October 20, 2006Reason for correction: -Correction: PDF FILEDetails: -