Difference between revisions of "De Bruijn–Newman constant"
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− | * Finch, Steven R. ''Mathematical Constants'', Encyclopedia of Mathematics and Its Applications '''94''', Cambridge University Press (2003) ISBN 0-521-81805-2 {{ZBL|1054.00001}} | + | * Finch, Steven R. ''Mathematical Constants'', Encyclopedia of Mathematics and Its Applications '''94''', Cambridge University Press (2003) {{ISBN|0-521-81805-2}} {{ZBL|1054.00001}} |
* Saouter, Yannick; Gourdon, Xavier; Demichel, Patrick. "An improved lower bound for the de Bruijn-Newman constant", ''Math. Comput.'' '''80''', No. 276, 2281-2287 (2011) {{DOI|10.1090/S0025-5718-2011-02472-5}} {{ZBL|1267.11094}} | * Saouter, Yannick; Gourdon, Xavier; Demichel, Patrick. "An improved lower bound for the de Bruijn-Newman constant", ''Math. Comput.'' '''80''', No. 276, 2281-2287 (2011) {{DOI|10.1090/S0025-5718-2011-02472-5}} {{ZBL|1267.11094}} |
Latest revision as of 20:25, 20 November 2023
2020 Mathematics Subject Classification: Primary: 11M [MSN][ZBL]
A constant $\Lambda$ describing the behaviour of functions related to the Riemann zeta-function. The Riemann hypothesis is equivalent to the assertion that $\Lambda \le 0$. By contrast, Newman conjectured that $\Lambda \ge 0$, and it is known that $\Lambda > −1·14541 \cdot 10^{−11}$.
Definition
Let $\Xi$ denote the Riemann xi-function, $\Xi(t) = \xi(\frac12 + it)$ where $$ \xi(s) = \frac12 s(s-1) \pi^{-s/2} \Gamma(s/2) \zeta(s) $$ with $\zeta(s)$ the Riemann zeta function. The Riemann hypothesis is equivalent to the assertion that all the zeroes of $\Xi$ lie on the real line.
We define a family of modified functions $H_\lambda$ by considering $\Xi$ as the Fourier transform of a function $\Phi(t)$ and defining $H_\lambda$ as the transform of $\Phi(t) \exp(\lambda t^2)$. The Riemann hypothesis is that $H_0$ has only real zeroes. De Bruijn proved that $H_\lambda$ has only real zeroes when $\lambda > \frac14$, and Newman showed that while there there exists a $\lambda$ such that $H_\lambda$ has non-real zeroes, there exists a $\Lambda$ such that $H_\lambda$ has only real zeroes for all $\lambda \ge \Lambda$. The infimum of such $\Lambda$ is the de Bruijn–Newman constant.
References
- Finch, Steven R. Mathematical Constants, Encyclopedia of Mathematics and Its Applications 94, Cambridge University Press (2003) ISBN 0-521-81805-2 Zbl 1054.00001
- Saouter, Yannick; Gourdon, Xavier; Demichel, Patrick. "An improved lower bound for the de Bruijn-Newman constant", Math. Comput. 80, No. 276, 2281-2287 (2011) DOI 10.1090/S0025-5718-2011-02472-5 Zbl 1267.11094
De Bruijn–Newman constant. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=De_Bruijn%E2%80%93Newman_constant&oldid=34666