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ON A CONJECTURE OF IGUSA

Published online by Cambridge University Press:  07 February 2013

Ben Lichtin*
Affiliation:
49 Boardman St., Rochester, NY 14607, U.S.A. (email: [email protected])
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Abstract

In his Tata Lecture Notes, Igusa conjectured the validity of a strong uniformity in the decay of complete exponential sums modulo powers of a prime number and determined by a homogeneous polynomial. This was proved for non-degenerate forms by Denef–Sperber and then by Cluckers for weighted homogeneous non-degenerate forms. In a recent preprint, Wright has proved this for degenerate binary forms. We give a different proof of Wright’s result that seems to be simpler and relies upon basic estimates for exponential sums mod $p$as well as a type of resolution of singularities with good reduction in the sense of Denef.

Type
Research Article
Copyright
Copyright © 2013 University College London 

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References

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