Remark on the roots of generalized Lens equations

Abstract

We consider roots of a generalized Lens polynomial L(z, z)= zm q(z)-p(z) and also harmonically splitting Lens type polynomial Lhs(z, z)=r( z)q(z)-p(z) and with deg\,q(z)=n, deg\,r( z)=m and deg\,p(z) n. We have shown that there exists a harmonically splitting polynomial r( z)q(z)-p(z) which takes 5n+m-6 roots, using a bifurcation family of polynomials. In this note, we show that this number can be taken by a generalized Lens polynomial zmq(z)-p(z) after a slight modification of the bifurcation family of a Rhie polynomial.