Published: 1979 Received: August 16, 1977Available on J-STAGE: October 20, 2006Accepted: -
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Date of correction: October 20, 2006Reason for correction: -Correction: AFFILIATIONDetails: Wrong :
1) Department of Mathematics Tokyo Institute of Technology
2) Department of Mathematics Faculty of Science University of Tokyo
Right :
1) Department of Mathematics Faculty of Science University of Tokyo
2) Department of Mathematics Tokyo Institute of Technology
Date of correction: October 20, 2006Reason for correction: -Correction: CITATIONDetails: Wrong : 1) E. Brieskorn, Beispiele zur Differentialtopologie von Singularitaten, Invent. Math., 2 (1966), 1-14. 2) H. Hamm, Lokale topologische Eigenschaften komplexer Räume, Math. Ann., 191 (1971), 235-252. 3) A. G. Kouchnirenko, Polyhèdres de Newton et nombres de Milnor, Invent. Math., 32 (1976), 1-31. 4) Lê Dung Tráng and C. P. Ramanujam, The invariance of Milnor's number implies the invariance of the topological type, Amer. J. Math., 98 (1976), 67-78. 5) J. Milnor, Singular Points of Complex Hypersurfaces. Ann. of Math. Studies 61, Princeton Univ. Press, 1968. 6) J. Milnor and P. Orlik, Isolated singularities defined by weighted homogeneous polynomials, Topology, 9 (1970), 385-393. 7) M. Oka, Deformation of Milnor fibering. J. Fac. Sci. Univ. Tokyo Sect. IA., 20, no. 3 (1973), 397-400. 8) A. N. Varchenko, Zeta-function of monodromy and Newton's diagram. Invent. Math., 37 (1976), 253-262. 9) R. C. Gunning and H. Rossi, Analytic functions of several complex variables, Prentice Hall, 1965. 10) H. Whitney, Tangents to an analytic variety, Ann. of Math., 81 (1965), 496-549.
Right : [1] E. Brieskorn, Beispiele zur Differentialtopologie von Singularitäten, Invent. Math., 2 (1966), 1-14. [2] H. Hamm, Lokale topologische Eigenschaften komplexer Räume, Math. Ann., 191 (1971), 235-252. [3] A. G. Kouchnirenko, Polyhèdres de Newton et nombres de Milnor, Invent. Math., 32 (1976), 1-31. [4] Lê Dung Tráng and C. P. Ramanujam, The invariance of Milnor's number implies the invariance of the topological type, Amer. J. Math., 98 (1976), 67-78. [5] J. Milnor, Singular Points of Complex Hypersurfaces. Ann. of Math. Studies 61, Princeton Univ. Press, 1968. [6] J. Milnor and P. Orlik, Isolated singularities defined by weighted homogeneous polynomials, Topology, 9 (1970), 385-393. [7] M. Oka, Deformation of Milnor fibering. J. Fac. Sci. Univ. Tokyo Sect. IA., 20, no. 3 (1973), 397-400. [8] A. N. Varchenko, Zeta-function of monodromy and Newton's diagram. Invent. Math., 37 (1976), 253-262. [9] R. C. Gunning and H. Rossi, Analytic functions of several complex variables, Prentice Hall, 1965. [10] H. Whitney, Tangents to an analytic variety, Ann. of Math., 81 (1965), 496-549.
Date of correction: October 20, 2006Reason for correction: -Correction: PDF FILEDetails: -