On a uniform bound for exponential sums modulo $p^m$ for Deligne polynomials

TL;DR

This paper proves Igusa's conjecture for exponential sums associated with polynomials over integers, improving bounds and extending results related to the distribution of rational points and the monodromy conjecture.

Contribution

It establishes a new uniform bound for exponential sums modulo p^m for Deligne polynomials, advancing understanding in exponential sum estimates and related conjectures.

Findings

Proves Igusa's conjecture for a broad class of exponential sums.

Improves bounds for the validity of the Hardy-Littlewood circle method.

Extends results on the strong monodromy conjecture in specific cases.

Abstract

Let $f$ be a polynomial of degree $d>1$ in $n$ variables over $\mathbb{Z}$. Let $f_d$ be the homogeneous part of degree $d$ of $f$ and $s$ be the dimension of the critical locus of $f_d$. In this paper, we prove Igusa's conjecture for exponential sums with the exponent $(n-s)/(2(d-1))$. This implies a weak solution for a recent conjecture raised by Cluckers and the author (2020) about an analogue of the results of Deligne (1974) and Katz (1999) for exponential sums over finite fields in the finite ring setting. Moreover, this also improves the result of Cluckers, Musta\c{t}\u{a} and the author (2019) in case $n-s>2(d-1)$. In particular, this result improves the conditions $n-s>2^d(d-1)$ of Birch (1962) and $n-s>3(d-1)2^{d-2}$ of Browning-Prendiville (2017) on the validity of the estimation for the major arcs to $(n-s)>4(d-1)$. Therefore this result may have further applications on subjects related to the Hardy-Littlewood circle method such as the Hasse principle or distribution of rational points in algebraic varieties. On the other hand, we also improve the recent work of Cluckers, Koll\'ar and Musta\c{t}\u{a} (2019) on the strong monodromy conjecture in the range $(-{\rm lct}((f)+J_f^2),0]$ in case of bad reduction and bad Schwartz-Bruhat function. Namely, in the range $(-{\rm lct}((f)+J_f^2),0]$, the real part of any pole of the Igusa local zeta functions associated with $f$ and any Schwartz-Bruhat function over any $p$-adic field is a root of the Bernstein-Sato polynomial of $f$.