Patrick Ingram
Published 2020-11-05Version 1
For R(z, w) rational with complex coefficients, of degree at least 2 in w, we show that the number of rational functions f(z) solving the difference equation f(z+1)=R(z, f(z)) is finite and bounded just in terms of the degrees of R in the two variables. This complements a result of Yanagihara, who showed that any finite-order meromorphic solution to this sort of difference equation must be a rational function. We prove a similar result for the differential equation f'(z)=R(z, f(z)), building on a result of Eremenko.
Geometric progressions in the sets of values of rational functions
A lower bound for the height of a rational function at $S$-unit points
Primitive values of rational functions at primitive elements of a finite field
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