Extension of the two-variable Pierce-Birkhoff conjecture to generalized polynomials

Abstract

Let R denote the reals, and let h: Rn --> R be a continuous, piecewise-polynomial function. The Pierce-Birkhoff conjecture (1956) is that any such h is representable in the form supi infj fij, for some finite collection of polynomials fij in R[x1,...,xn]. (A simple example is h(x1) = |x1| = supx1, -x1.) In 1984, L. Mahe and, independently, G. Efroymson, proved this for n < 3; it remains open for n > 2. In this paper we prove an analogous result for "generalized polynomials" (also known as signomials), i.e., where the exponents are allowed to be arbitrary real numbers, and not just natural numbers; in this version, we restrict to the positive orthant, where each xi > 0. As before, our methods work only for n < 3.