Non-trivial simple poles at negative integers and mass concentration at singularity |
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Authors: | D. Barlet H.-M. Maire |
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Affiliation: | 1.Université H. Poincaré et Institut Universitaire de France, Institut E. Cartan, Bo?te postale 239, 54506 Vandoeuvre-les-Nancy, France (e-mail: barlet@iecn.u-nancy.fr),FR;2.Section de Mathématiques, Université de Genève, Case postale 240, 1211 Genève, Switzerland (e-mail: henri.maire@math.unige.ch),CH |
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Abstract: | Let (X,0) be the germ of a normal space of dimension n+1 and let f be the germ at 0 of a holomorphic function on X. Assume both X and f have an isolated singularity at 0. Denote by J the image of the restriction map , where F is the Milnor fibre of f at 0. We prove that the canonical Hermitian form on , given by poles of order at in the meromorphic extension of , passes to the quotient by J and is non-degenerate on . We show that any non-zero element in J produces a “mass concentration” at the singularity which is related to a simple pole concentrated at for (in a non-na?ve sense). We conclude with an application to the asymptotic expansion of oscillatory integrals , for , when . Received: 28 May 2001 / Published online: 26 April 2002 |
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Keywords: | Mathematics Subject Classification (2000): 32C30 32S30 32S50 58K05 |
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