Activities This Week
Noncommutative Analysis
Structure of crossed product $C^*$-algebras
May 23, 11:00—12:00, 2022, Building 32, room 114
Speaker
Zhuang Niu (University of Wyoming)
Abstract
Consider a dynamical system, and let us study the structure of the corresponding crossed product $C^*$-algebra, in particular on the classifiability, comparison, and stable rank. More precisely, let us introduce a uniform Rokhlin property and a relative comparison property (these two properties hold for all free and minimal $Z^d$ actions). With these two properties, the crossed product $C^*$-algebra is shown to always have stable rank one, to satisfy the Toms-Winter conjecture, and that the comparison radius is dominated by half of the mean dimension of the dynamical system.
Colloquium
Approximated and stable groups
May 24, 14:30—15:30, 2022, Math -101
Speaker
Arie Levit (Tel Aviv University)
Abstract
In the study of infinite discrete groups it is useful to consider imperfect approximations by finitary models (either permutations or matrices). I will talk about the stability of such approximations, i.e. can it always be corrected to a perfect approximation, focusing mostly on amenable groups. The involved techniques include ergodic theory and dynamics as well as character theory of infinite groups. Some directions and open problems will be presented.
אשנב למתמטיקה
בניה טבעית של המספרים הממשיים
May 24, 16:10—17:30, 2022, אולם -101, בניין מתמטיקה
Speaker
יאיר הרטמן
Abstract
מה צריך בשביל לבנות את המספרים הממשיים? אפסילונים? גבולות? לא בהכרח.
בהרצאה נבנה ביחד את המספרים הממשיים. נא להביא אתכם את המספרים השלמים ואת פעולת החיבור עליהם (מי שחושש שזה לא יספיק שיביא גם בקבוק ספרייט ומספריים)
AGNT
Bloch-Kato Groups and Iwasawa Theory in Chabauty-Kim
May 25, 16:00—17:00, 2022, -101
Speaker
David Corwin (BGU)
Abstract
We explain different kinds of Selmer groups, which are subgroups of Galois cohomology, including Bloch-Kato, strict, and Greenberg Selmer groups. We state part of the Bloch-Kato conjectures and describe a bound joint with A. Betts and M. Leonhardt on the number of rational points on a general higher genus curve, conditional on the Bloch-Kato conjectures. Finally, we explain how to use some Iwasawa theory, specifically Kato’s Euler system and a control theorem of Ochiai, to deduce specific cases of Bloch-Kato associated with elliptic curves.
BGU Probability and Ergodic Theory (PET) seminar
Universality for R^d-flows Online
May 26, 11:10—12:00, 2022, -101
Speaker
Shrey Sanadhya (Ben-Gurion University)
Abstract
A dynamical system is called universal if any system with lower entropy can be embedded into it. In this talk, we will discuss universality for $R^d$ flows $(d>1)$ both in ergodic and Borel contexts. We will discuss a specification property that implies universality for $R^d$ flows and provide an example of a tiling dynamical system with this specification property. This is ongoing work with Tom Meyerovitch. This talk is a preliminary report.