Périodes évanescentes et $(a,b)$-modules monogènes

Details Périodes évanescentes et $(a,b)$-modules monogènes Périodes évanescentes et $(a,b)$-modules monogènes

2009-01-14

arxiv.org/abs/0901.1953v1

Mathematics

Algebraic Geometry

Scientific paper

In order to describe the asymptotic behaviour of a vanishing period in a one parameter family we introduce and use a very simple algebraic structure : regular geometric (a,b)-modules generated (as left $\A-$modules) by one element. The idea is to use not the full Brieskorn module associated to the Gauss-Manin connection but a minimal (regular) differential equation satisfied by the period integral we are interested in. We show that the Bernstein polynomial associated is quite simple to compute for such (a,b)-modules and give a precise description of the exponents which appears in the asymptotic expansion which avoids integral shifts. We show a couple of explicit computations in some classical (but not so easy) examples.

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