\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 AGNT}\\[0.2\baselineskip] \rule{\textwidth}{0.4pt}\vspace*{-\baselineskip}\vspace{3.2pt} \rule{\textwidth}{1.6pt}\\[\baselineskip] \textbf{On} \emph{Wednesday, December 4, 2024} \bigskip \textbf{At} \emph{14:10 -- 15:10} \bigskip \textbf{In} \emph{-101} \vspace*{2\baselineskip} {\large\scshape Yotam Hendel % (BGU) } \bigskip will talk about \bigskip {\Large\bfseries On uniform dimension growth bounds for rational points on algebraic varieties\par} \bigskip \end{center} \vfill \textsc{Abstract:} Let X be an integral projective variety defined over Q of degree at least 2 and B \textgreater{} 0 an integer. The (uniform) dimension growth conjecture, now proven in almost all cases following works of Browning, Heath-Brown and Salberger, provides a uniform upper bound on the number of rational points of height at most B lying on X, where the bound depends only on the degree of X, the dimension of its ambient space, and on B. In this talk, I will report on current developments which go beyond classical uniform dimension growth bounds, focusing on an affine variant (which implies the projective one). This is based on joint work with Cluckers, Dèbes, Nguyen and Vermeulen. % vim: ft=eruby.tex: \end{document} % vim: ft=eruby.tex: