Montgomery, Hugh
Exploring the Riemann Zeta Function
1. An Introduction to Riemann’s Life, His Mathematics, and His Work on the Zeta Function
Roger Baker
2. Ramanujan’s Formula for
Bruce C. Berndt, Armin Straub
3. Towards a Fractal Cohomology: Spectra of Polya–Hilbert Operators, Regularized Determinants and Riemann Zeros
Tim Cobler, Michel L. Lapidus
4. The Temptation of the Exceptional Characters
John B. Friedlander, Henryk Iwaniec
5. Arthur’s Truncated Eisenstein Series for
Dorian Goldfeld
6. On a Cubic Moment of Hardy’s Function with a Shift
Aleksandar Ivić
7. Some Analogues of Pair Correlation of Zeta Zeros
Yunus Karabulut, Cem Yalçın Yıldırım
8. Bagchi’s Theorem for Families of Automorphic Forms
E. Kowalski
9. The Liouville Function and the Riemann Hypothesis
Michael J. Mossinghoff, Timothy S. Trudgian
10. Explorations in the Theory of Partition Zeta Functions
Ken Ono, Larry Rolen, Robert Schneider
11. Reading Riemann
S. J. Patterson
12. A Taniyama Product for the Riemann Zeta Function
David E. Rohrlich
Avainsanat: Mathematics, Number Theory, Algebraic Geometry, Functions of a Complex Variable, Dynamical Systems and Ergodic Theory, Difference and Functional Equations, Abstract Harmonic Analysis
- Toimittaja
- Montgomery, Hugh
- Nikeghbali, Ashkan
- Rassias, Michael Th.
- Julkaisija
- Springer
- Julkaisuvuosi
- 2017
- Kieli
- en
- Painos
- 1
- Sivumäärä
- 10 sivua
- Kategoria
- Eksaktit luonnontieteet
- Tiedostomuoto
- E-kirja
- eISBN (PDF)
- 9783319599694
- Painetun ISBN
- 978-3-319-59968-7