References
- [Ahlfors 79] L. R. Ahlfors. Complex Analysis. Third edition. New York: McGraw-Hill, 1979.
- [Ahlfors 10] L. R. Ahlfors. Conformal Invariants. Providence: Chelsea, 2010.
- [Bergweiler 99] W. Bergweiler. “Iteration of Meromorphic Functions.” Bull. Am. Math. Soc. 26 (1999), 151–188.
- [Gourdon] X. Gourdon. “The 1013 First Zeros of the Riemann Zeta Function, and Zeros Computation at Very Large Height.” Available online (http://numbers.computation.free.fr/) Constants/Misce-llaneous/zetazeros1e13-1e24.pdf
- [Ivić 85] A. Ivić. The Riemann Zeta-Function. Mineola: Dover Publications, 1985.
- [Milnor 06] J. Milnor. Dynamics in One Complex Variable. Third edition. Ann. of Math. Studies 160. Princeton: Princeton University Press, 2006.
- [Mueller 83] J. Mueller. “Arithmetic Equivalent of Essential Simplicity of Zeta Zeros.” Trans. Am. Math. Soc. 275:1 (1983), 175–183.
- [Mayer and Schleicher 06] S. Mayer and D. Schleicher. “Immediate and Virtual Basins of Newton’s Method for Entire Functions.” Ann. Inst. Fourier 56:2 (2006), 325–336.
- [Rubinstein and Sarnak 94] M. Rubinstein and P. Sarnak. “Chebyshev’s Bias.” Exp. Math. 3 (1994), 173–197.
- [Schleicher 08] D. Schleicher. “Newton’s Method as a Dynamical System: Efficient Root Finding of Polynomials and the Riemann ζ Function.” Fields Inst. Commun. 53 (2008), 213–224.
- [Titchmarsh 86] E. C. Titchmarsh. The Theory of the Riemann Zeta Function. Second edition. Oxford: Oxford University Press, 1986.