References
Federer, H.: Geometric measure theory. Berlin Heidelberg New York: Springer 1969
Fu, J.H.G.: Curvature measures and Chern classes of singular analytic varieties. (Preprint 1989)
Fu, J.H.G.: Curvature measures of subanalytic sets. (Preprint 1990)
Grauert, H.: On Levi's problem and the imbedding of real-analytic manifolds. Ann. Math.68, 460–471 (1958)
Hamm, H., Lê, D.T.: Un théorème de Zariski du type de Lefschetz. Ann. Sci. Éc. Norm. Supér.6, 317–366 (1973)
Kennedy, G.: Specialization of MacPherson's Chern classes. Math. Scand. (To appear)
King, J.R.: The currents defined by analytic varieties. Acta Math.127, 185–220 (1971)
Kleiman, S.: About the conormal scheme. In: Greco, S., Strano, R.: (eds.) Complete intersections. (Lect. Notes Math., vol. 1092, pp. 161–197) Berlin Heidelberg New York: Springer 1984
Lê, D.T., Teissier, B.: Limites d'espaces tangents en géometrie analytique. Comment. Math. Helv.63, 540–578 (1988)
Sabbah, C.: Quelques remarques sur la géométrie des espaces conormaux. Astérisque130, 161–192 (1985)
Verdier, J.L.: Spécialisation des classes de Chern. Astérisque82–83, 149–159 (1981)
Whitney, H.: Tangents to an analytic variety. Ann. Math.81, 496–549 (1965)
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This work was supported in part by a grant from the National Science Foundation (DM-8902400)
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Fu, J.H.G. On Verdier's specialization formula for Chern classes. Math. Ann. 291, 247–251 (1991). https://doi.org/10.1007/BF01445204
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DOI: https://doi.org/10.1007/BF01445204