Admissible solutions of delay Schwarzian differential equations

Abstract

In this paper, we study delay differential equations involving the Schwarzian derivative S(f,z), expressed in the form equation* f(z+1)f(z-1) + a(z)S(f,z) =R(z,f(z))= P(z,f(z))Q(z,f(z)) equation* where a(z) is rational, P(z,f) and Q(z,f) are coprime polynomials in f with rational coefficients. Our main result shows that if a subnormal transcendental meromorphic solution exists, then the rational function R(z,f)=P(z,f)/Q(z,f) satisfies fR≤ 7 and fP≤ fQ +2, where fR =\fP, fQ\. Furthermore, for any rational root b1 of Q(z,f) in f with multiplicity k, we show that k ≤ 2. Finally, a classification of such equations is provided according to the multiplicity structure of the roots of Q(z,f). Some examples are given to support these results.

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