On irreducible components of real exponential hypersurfaces

Abstract

Fix any algebraic extension K of the field Q of rationals. In this article we study exponential sets V⊂ Rn. Such sets are described by the vanishing of so called exponential polynomials, i.e., polynomials with coefficients from K, in n variables, and in n exponential functions. The complements of all exponential sets in Rn form a Noethrian topology on Rn, which we will call Zariski topology. Let P ∈ K[X1, … ,Xn,U1, … ,Un] be a polynomial such that V=\ x=(x1, … , xn) ∈ Rn| P(x, ex1, … ,exn)=0 \. The main result of this paper states that, under Schanuel's conjecture over the reals, an exponential set V of codimension 1, for which the real algebraic set Zer(P) is irreducible over K, either is irreducible (with respect to the Zariski topology) or every of its irreducible components of codimension 1 is a rational hyperplane through the origin. The family of all possible hyperplanes is determined by monomials of P. In the case of a single exponential (i.e., when P is independent of U2, … , Un) stronger statements are shown which are independent of Schanuel's conjecture.