CRC Colloquium: Prof. Dr. Christopher Deninger (Universität Münster): Special values of Hasse-Weil and Ruelle zeta functions.
Thursday, 07.12.2023 14:00 im Raum M5
After a discussion of Hasse-Weil zeta functions of arithmetic varieties X, beginning with the Riemann zeta function, we explain Lichtenbaum's conjecture for their values at zero. We then discuss a class of dynamical systems whose closed orbits behave in some sense like the closed points of an arithmetic variety. Under some extra conditions we show that using the Cheeger-Müller secondary index theorem an analogue of Lichtenbaum's conjecture can be proved for their Ruelle zeta functions. Moreover, for any arithmetic variety X, we sketch the construction of a dynamical system whose periodic orbits correspond to the closed points of X. In particular, for X = spec Z we obtain a dynamical system whose periodic orbits correspond to the prime numbers p, with the length of the orbit being log p.
Angelegt am 06.04.2023 von Anja Böckenholt
Geändert am 27.11.2023 von Anja Böckenholt
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