\ifx\danslelivre\undefined
\documentclass[9pt]{../configuration/smfart}
\input{../configuration/commun}
\input{../configuration/smf}
\input{../configuration/adresse}
\input{../configuration/gadgets}
\input{../configuration/francais}
\input{../configuration/numerotation}
\input{../configuration/formules}
\input{../configuration/encoredesmacros}
\synctex=1
\usepackage{stmaryrd}
\usepackage{graphics}
\usepackage[usenames,dvipsnames]{xcolor}
\usepackage{srcltx}
\usepackage{tikz}
\usetikzlibrary{matrix}
\usetikzlibrary{calc}

\title{Différentielles}

\externaldocument{extensions-algebriques}
\externaldocument{correspondance-galois}
\externaldocument{formes-tordues}
\externaldocument{spectre}
\externaldocument{verselles}
\externaldocument{corps-finis}
\externaldocument{entiers}
\externaldocument{categories}

%\textwidth16cm
%\hoffset-1.5cm
\usepackage[a4paper,left=2cm,right=2cm,marginpar=0.2cm,marginparsep=0.6cm,vmargin=2.4cm]{geometry}

\begin{document}
\begin{center}
Différentielles
\end{center}
\tableofcontents
\else
\chapter{Différentielles}
\fi

\section{}


\section{}

\begin{théorème2}
\XXX
Une extension $K\bo k$ est algébrique séparable
si et seulement si $Ω¹_{K\bo k}=0$.
\end{théorème2}






\ifx\danslelivre\undefined
\bibliography{../configuration/bibliographie-livre}
\bibliographystyle{../configuration/style-bib-livre}
\end{document}
\fi