Belovas, I.; Sabaliauskas, M.; Kuzma, L. Series with Binomial-like Coefficients for the Investigation of Fractal Structures Associated with the Riemann Zeta Function. Fractal Fract.2022, 6, 300.
Belovas, I.; Sabaliauskas, M.; Kuzma, L. Series with Binomial-like Coefficients for the Investigation of Fractal Structures Associated with the Riemann Zeta Function. Fractal Fract. 2022, 6, 300.
Belovas, I.; Sabaliauskas, M.; Kuzma, L. Series with Binomial-like Coefficients for the Investigation of Fractal Structures Associated with the Riemann Zeta Function. Fractal Fract.2022, 6, 300.
Belovas, I.; Sabaliauskas, M.; Kuzma, L. Series with Binomial-like Coefficients for the Investigation of Fractal Structures Associated with the Riemann Zeta Function. Fractal Fract. 2022, 6, 300.
Abstract
The paper continues the study of efficient algorithms for the computation of zeta functions over the complex plane. We aim to apply the modifications of algorithms to the investigation of underlying fractal structures associated with the Riemann zeta function. We discuss the computational complexity and numerical aspects of the implemented algorithms based on series with binomial-like coefficients.
Computer Science and Mathematics, Computational Mathematics
Copyright:
This is an open access article distributed under the Creative Commons Attribution License which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.