\documentclass[oneside,final,12pt]{book} \usepackage{amssymb} \usepackage{amsmath} \usepackage{xunicode} \usepackage{hyperref} \usepackage{xstring} \def\rooturl{https://www.math.bgu.ac.il/} \hyperbaseurl{\rooturl} \let\hhref\href \providecommand{\extrahref}[2][]{\LTRfootnote{\LR{\IfBeginWith*{#2}{http}{\nolinkurl{#2}}{\nolinkurl{\rooturl#2}}}}} \renewcommand{\href}[2]{\IfBeginWith*{#1}{http}{\hhref{#1}{#2}}{\hhref{\rooturl#1}{#2}}\extrahref{#1}} \usepackage{polyglossia} \usepackage{longtable} %% even in English, we sometimes have Hebrew (as in course hours), and we %% can't add it in :preamble, since it comes after hyperref %%\usepackage{bidi} \setdefaultlanguage{english} \setotherlanguage{hebrew} %%\setmainfont[Ligatures=TeX]{Libertinus Serif} \setmainfont[Script=Hebrew,Ligatures=TeX]{LibertinusSerif}[ UprightFont = *-Regular, BoldFont = *-Bold, ItalicFont = *-Italic, BoldItalicFont = *-BoldItalic, Extension = .otf] \SepMark{‭.} \robustify\hebrewnumeral \robustify\Hebrewnumeral \robustify\Hebrewnumeralfinal % vim: ft=eruby.tex: \begin{document} \pagestyle{empty} \pagenumbering{gobble} \begin{center} \vspace*{\baselineskip} {\Large Department of Mathematics, BGU} \vspace*{\baselineskip} \rule{\textwidth}{1.6pt}\vspace*{-\baselineskip}\vspace*{2pt} \rule{\textwidth}{0.4pt}\\[\baselineskip] {\Huge PRO (Presenting Results of Others) Seminar}\\[0.2\baselineskip] \rule{\textwidth}{0.4pt}\vspace*{-\baselineskip}\vspace{3.2pt} \rule{\textwidth}{1.6pt}\\[\baselineskip] \textbf{On} \emph{Thursday, May 28, 2026} \bigskip \textbf{At} \emph{10:00 -- 11:00} \bigskip \textbf{In} \emph{-101} \vspace*{2\baselineskip} {\large\scshape Nadav Kalma % (BGU) } \bigskip will talk about \bigskip {\Large\bfseries Infinite volume and infinite injectivity radius (Mikolaj Fraczyk, Tsachik Gelander)\par} \bigskip \end{center} \vfill \textsc{Abstract:} In their paper, Frączyk and Gelander prove a conjecture by Margulis: for a higher-rank simple Lie group \$G\$, a discrete subgroup has an infinite injectivity radius if and only if it has infinite covolume. The novel methods used to resolve this rely on ergodic theory—specifically, analyzing random walks on the space of discrete subgroups, alongside new stiffness and rigidity results for these stationary measures. In this talk, I will introduce the foundational definitions and present an outline of the main arguments used to prove the conjecture. \href{https://arxiv.org/abs/2101.00640}{Link to paper} % vim: ft=eruby.tex: \end{document} % vim: ft=eruby.tex: