\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, November 6, 2024} \bigskip \textbf{At} \emph{14:10 -- 15:10} \bigskip \textbf{In} \emph{-101} \vspace*{2\baselineskip} {\large\scshape Nadav Gropper % (University of Haifa) } \bigskip will talk about \bigskip {\Large\bfseries TQFTs for pro-p Poincare duality groups\par} \bigskip \end{center} \vfill \textsc{Abstract:} In the talk, I will discuss the Turner-Turaev formalism for unoriented Topological Quantum Field Theory (TQFT). Building upon this formalism, I will introduce an analogous version for (d+1)-dimensional TQFT for pro-p Poincare duality groups. In the case of d = 1, this enables us to study cobordisms and TQFTs for both the maximal pro-p quotient of absolute Galois groups of p-adic fields and pi\_1(X)\^{}p, the pro-p completions of fundamental groups of surfaces. This generalisation gives a framework for arithmetic TQFTs and strengthens the analogies within arithmetic topology, which relates p-adic fields to surfaces (oriented mod p\^{}r). I will explain the classification of TQFTS for the (1+1)-dimensional case, in terms of Frobenius algebras with some extra structure. If time permits, I will explain how we define a Dijkgraaf Witten like theory, to get formulas for counting G-covers of X, where X is either a surface, or a p adic field, and G is a p-group (these formulas are similar to the ones given by Mednykh for surfaces using TQFTs, and by Masakazu Yamagishi using a more algebraic approach). I will also try to outline how we plan to also get similar formulas for Hom(\textbackslash{}pi\_1(X)\^{}p,G), where G=GL\_n(k) for k=F\_\{p\^{}r\} or Z/p\^{}rZ. The talk is based on joint work with Oren Ben-Bassat. % vim: ft=eruby.tex: \end{document} % vim: ft=eruby.tex: