Rational Solutions of First Order Algebraic Ordinary Differential Equations

Abstract

Let f(t,y,y')=Σi=0n ai(t,y)y'i=0 be an irreducible first order ordinary differential equation with polynomial coefficients. Eremenko in 1998 proved that there exists a constant C such that every rational solution of f(t,y,y')=0 is of degree not greater than C. Examples show that this degree bound C depends not only on the degrees of f in t,y,y' but also on the coefficients of f viewed as the polynomial in t,y,y'. In this paper, we show that if f satisfies deg(f,y)<deg(f,y') or i=0n \deg(ai,y)-2(n-i)\>0 then the degree bound C only depends on the degrees of f in t,y,y', and furthermore we present an explicit expression for C in terms of the degrees of f in t,y,y'.