Zeros of E-functions and of exponential polynomials defined over Q

Abstract

Zeros of Bessel functions Jα play an important role in physics. They are a motivation for studying zeros of exponential polynomials defined over Q, and more generally of E-functions. In this paper we partially characterize E-functions with zeros of the same multiplicity, and prove a special case of a conjecture of Jossen on entire quotients of E-functions, related to Ritt's theorem and Shapiro's conjecture on exponential polynomials. We also deduce from Schanuel's conjecture many results on zeros of exponential polynomials over Q, including π, logarithms of algebraic numbers, and zeros of Jα when 2α is an odd integer. For the latter we define (if α≠1/2) an analogue of the minimal polynomial and Galois conjugates of algebraic numbers. At last, we study conjectural generalizations to factorization and zeros of E-functions.

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