Product details:
| ISBN13: | 9781009384803 |
| ISBN10: | 1009384805 |
| Binding: | Hardback |
| No. of pages: | 704 pages |
| Size: | 240x162x48 mm |
| Weight: | 1270 g |
| Language: | English |
| 705 |
Category:
Equivalents of the Riemann Hypothesis: Volume 3, Further Steps towards Resolving the Riemann Hypothesis
Publisher: Cambridge University Press
Date of Publication: 12 October 2023
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Short description:
This third volume presents further equivalents to the Riemann hypothesis and explores its decidability.
Long description:
The Riemann hypothesis (RH) may be the most important outstanding problem in mathematics. This third volume on equivalents to RH comprehensively presents recent results of Nicolas, Rogers-Tao-Dobner, Polymath15, and Matiyasevich. Particularly interesting are derivations which show, assuming all zeros on the critical line are simple, that RH is decidable. Also included are classical P&&&243;lya-Jensen equivalence and related developments of Ono et al. Extensive appendices highlight key background results, most of which are proved. The book is highly accessible, with definitions repeated, proofs split logically, and graphical visuals. It is ideal for mathematicians wishing to update their knowledge, logicians, and graduate students seeking accessible number theory research problems. The three volumes can be read mostly independently. Volume 1 presents classical and modern arithmetic RH equivalents. Volume 2 covers equivalences with a strong analytic orientation. Volume 3 includes further arithmetic and analytic equivalents plus new material on RH decidability.
Table of Contents:
1. Nicolas' &&&960;(x) < li(&&&952;(x)) equivalence; 2. Nicolas' number of divisors function equivalence; 3. An aspect of the zeta function zero gap estimates; 4. The Rogers-Tao equivalence; 5. The Dirichlet series of Dobner; 6. An upper bound for the deBruijn-Newman constant; 7. The P&&&243;lya-Jensen equivalence; 8. Ono et al. and Jensen polynomials; 9. Gonek-Bagchi universality and Bagchi's equivalence; 10. A selection of undecidable propositions; 11. Equivalences and decidability for Riemann's zeta; A. Imports for Gonek's theorems; B. Imports for Nicolas' theorems; C. Hyperbolic polynomials; D. Absolute continuity; E. Montel and Hurwitz's theorems; F. Markov and Gronwall's inequalities; G. Characterizing Riemann's zeta function; H. Bohr's theorem; I. Zeta and L-functions; J. de Reyna's expansion for the Hardy contour; K. Stirling's approximation for the gamma function; L. Propositional calculus $\mathscr{P}_0$; M. First order predicate calculus $\mathscr{P}_1$; N. Recursive functions; O. Ordinal numbers and analysis; References; Index
