Activities This Week
Algebraic Geometry and Number Theory
Integrable hierarchies, wave functions and open intersection theories
Nov 22, 15:10—16:30, 2017, Math -101
Speaker
Ran Tessler (ETH)
Abstract
I will discuss the KdV integrable hierarchy, and its tau functions and wave functions.
Witten conjectured that the tau functions are the generating functions of intersection numbers over the moduli of curves (now Kontsevich’s theorem). Recently the following was conjectured: The KdV wave function is a generating function of intersection numbers on moduli of “Riemann surfaces with boundary” (Pandharipande-Solomon-T,Solomon-T,Buryak).
I will describe the conjecture, its generalization to all genera (Solomon-Tessler), and sketch its proof (Pandharipande-Solomon-T in genus 0, T,Buryak-T for the general case). If there will be time, I’ll describe a conjectural generalization by Alexandrov-Buryak-T.
A night of mathematics and Jazz
Nov 26, 18:00—22:00, 2017, Math -101
All faculty and students are cordially invited.
Program
18:00 Undergraduate math club
Barak Weiss, Tel Aviv University
The illumination problem
The following elementary problem in geometry is still open: given a polygon $P$ in the plane, say that points $x$ and $y$ in $P$ see each other if there is a billiard path from $x$ to $y$. Is there a polygon in which infinitely many pairs of points do not see each other?
Such problems turn out to be easy to state but very difficult to solve. I will explain this and related questions in greater detail, and describe some recent progress which relies on well-known work of Eskin and Mirzakhani (part of the late Maryam Mirzakhani’s Field medal citation).
19:00 A Jazz show by Tsachik and the perverse sheaves
Ehud Ettun on bass
Haruka Yabuno on Piano
Tsachik Gelander on drums
Operator Algebras and Operator Theory
Completely Positive Noncommutative Kernels
Nov 27, 16:00—17:00, 2017, -101
Speaker
Gregory Marx (BGU)
Abstract
It is well known that a function $K: \Omega \times \Omega \to \mathcal{L}(\mathcal{Y})$ (where $\mathcal{L}(\mathcal{Y}$) is the set of all bounded linear operators on a Hilbert space$\mathcal Y$) being (1) a positive kernel in the sense of Aronszajn (i.e. $\sum_{i,j=1}^N \langle K(\omega_i , \omega_j) y_j, y_i \rangle \geq 0$ for all $\omega_1, \dots, \omega_N \in \Omega$, $y_1, \dots, y_N \in \mathcal Y$, and $N=1,2,\dots$) is equivalent to (2) $K$ being the reproducing kernel for a reproducing kernel Hilbert space $\mathcal H (K)$, and (3) $K$ having a Kolmogorov decomposition $K(\omega, \zeta)=H(\omega)H(\zeta)^*$ for an operator-valued function $H: \Omega \to \mathcal{L}(\mathcal X, \mathcal Y)$ where $\mathcal X$ is an auxiliary Hilbert space.
In work with Joe Ball and Victor Vinnikov, we extend this result to the setting of free noncommutative functions with the target set $\mathcal L ( \mathcal Y)$ of $K$ replaced by $\mathcal L (\mathcal A, \mathcal L (\mathcal Y))$ where $\mathcal A$ is a $C^*$-algebra. In my talk, I will give a sketch of our proof and discuss some well-known results (e.g. Stinespring’s dilation theorem for completely positive maps) which follow as corollaries. With any remaining time, I will talk about applications and more recent related results.
BGU Probability and Ergodic Theory (PET) seminar
Ergodic theorems for random walks on locally compact groups
Nov 28, 11:00—12:00, 2017, 201
Speaker
Michael Lin (BGU)
Abstract
See attached file
Logic, Set Theory and Topology
Steps towards a model theory of almost complex geometry
Nov 28, 12:15—13:30, 2017, Math -101
Speaker
Michael Wan (BGU)
Abstract
Zilber showed that a compact complex manifold $M$, equipped with the structure generated by the collection of all complex analytic subsets of each $M^n$, is well-behaved from a logical perspective, forming a Zariski geometry in the sense of Hrushovski and Zilber. This has led to fruitful model-theoretic developments, including a classification of definable groups, the isolation of the canonical base property, and a theory of generic automorphisms.
Motivated by this example, we will examine the possibility of emulating this theory in the setting of an almost complex manifold, a real manifold equipped with a smoothly-varying complex vector space structure on each tangent space. In particular, we will define the notion of a pseudoanalytic subset of an almost complex manifold. We develop some rudimentary almost complex analytic geometry, including an identity principle for almost complex maps, and an analysis of the singular part of a pseudoanalytic subset under some algebraic conditions. The lack of a true algebraic theory means that geometric methods, including pseudoholomorphic curves and almost complex connections, have to pick up the slack. These results hint at routes towards an almost complex analogue of Zilber’s theorem.
Colloquium
On dense subgroups of permutation groups
Nov 28, 14:30—15:30, 2017, Math -101
Speaker
Itay Kaplan (Hebrew University)
Abstract
Joint work with Pierre Simon. I will present a criterion that ensures that Aut(M) has a 2-generated dense subgroup when M is a countable structure (which holds in many examples), and discuss related subjects.