Published: 1978 Received: December 16, 1976Available on J-STAGE: October 20, 2006Accepted: -
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Correction information
Date of correction: October 20, 2006Reason for correction: -Correction: AUTHORDetails: Wrong : Tetsuro OKUYAMA1), Tomoyuki YOSHIDA2) Right : Tetsuro OKUYAMA1), Tomoyuki YOSHIDA1)
Date of correction: October 20, 2006Reason for correction: -Correction: AFFILIATIONDetails: Wrong :
1) Department of Mathematics Faculty of Science Hokkaido University
2) Department of Mathematics Faculty of Science Hokkaido University
Right :
1) Department of Mathematics Faculty of Science Hokkaido University
Date of correction: October 20, 2006Reason for correction: -Correction: CITATIONDetails: Wrong : 1) U. Dempwolff, A characterization of the Rudvalis simple group of order 214•33• 53•7•13•29 by the centralizers of noncentral involutions, J. Algebra, 32 (1974), 53-88. 2) W. Feit, Representations of finite groups, I, Yale Univ. lecture notes (mimeo-graph), 1969. 3) D. Goldschmidt, 2-fusion in finite groups, Ann. of Math., 99 (1974), 70-117. 4) D. Gorenstein, Finite Groups, Harper and Row, New York, 1968. 5) D. Gorenstein, Centralizers of involutions in finite simple groups, “Finite Simple Groups”. edited by Powell and Higman, Academic Press, 1971. 6) D. Parrot, A characterization of the Rudvalis simple group, to appear. 7) T. Yoshida, An alternate proof of a transfer theorem without using transfer, Proc. Japan Acad., 52 (1976), 171-173. 8) S. B. Assa, A characterization of 2F4(2)' and the Rudvalis group. J. Algebra, 41 (1976), 473-495.
Right : [1] U. Dempwolff, A characterization of the Rudvalis simple group of order 214·33·53·7·13·29 by the centralizers of noncentral involutions, J. Algebra, 32 (1974), 53-88. [2] W. Feit, Representations of finite groups, I, Yale Univ. lecture notes (mimeograph), 1969. [3] D. Goldschmidt, 2-fusion in finite groups, Ann. of Math., 99 (1974), 70-117. [4] D. Gorenstein, Finite Groups, Harper and Row, New York, 1968. [5] D. Gorenstein, Centralizers of involutions in finite simple groups, “Finite Simple Groups”, edited by Powell and Higman, Academic Press, 1971. [6] D. Parrot, A characterization of the Rudvalis simple group, to appear. [7] T. Yoshida, An alternate proof of a transfer theorem without using transfer, Proc. Japan Acad., 52 (1976), 171-173. [8] S. B. Assa, A characterization of 2F4(2)' and the Rudvalis group, J. Algebra, 41 (1976), 473-495.
Date of correction: October 20, 2006Reason for correction: -Correction: PDF FILEDetails: -