Stable algebras of entire functions

Abstract

Suppose that h and g belong to the algebra generated by the rational functions and an entire function f of finite order on Cn and that h/g has algebraic polar variety. We show that either h/g∈ or f=q1ep+q2, where p is a polynomial and q1,q2 are rational functions. In the latter case, h/g belongs to the algebra generated by the rational functions, ep and e-p.