On meromorphic solutions of Malmquist type difference equations

Abstract

Recently, the present authors used Nevanlinna theory to provide a classification for the Malmquist type difference equations of the form f(z+1)n=R(z,f) () that have transcendental meromorphic solutions, where R(z,f) is rational in both arguments. In this paper, we first complete the classification for the case f(R(z,f))=n of~() by identifying a new equation that was left out in our previous work. We will actually derive all the equations in this case based on some new observations on~(). Then, we study the relations between () and its differential counterpart (f')n=R(z,f). We show that most autonomous equations, singled out from~() with n=2, have a natural continuum limit to either the differential Riccati equation f'=a+f2 or the differential equation (f')2=a(f2-τ12)(f2-τ22), where a=0 and τi are constants such that τ12=τ22. The latter second degree differential equation and the symmetric QRT map are derived from each other using the bilinear method and the continuum limit method.