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bug#20296: 11.88.3; LaTeX-fill-paragraph gives unexpected result
From: |
jfbu |
Subject: |
bug#20296: 11.88.3; LaTeX-fill-paragraph gives unexpected result |
Date: |
Fri, 10 Apr 2015 22:09:26 +0200 |
Remember to cover the basics, that is, what you expected to happen and
what in fact did happen.
Be sure to consult the FAQ section in the manual before submitting
a bug report. In addition check if the bug is reproducable with an
up-to-date version of AUCTeX. So please upgrade to the version
available from http://www.gnu.org/software/auctex/ if your
installation is older than the one available from the web site.
If the bug is triggered by a specific (La)TeX file, you should try
to produce a minimal sample file showing the problem and include it
in your report.
Your report will be posted for the auctex package at the GNU bug
tracker. Visit http://debbugs.gnu.org/cgi/pkgreport.cgi?pkg=auctex
to browse existing AUCTeX bugs.
------------------------------------------------------------------------
Emacs : GNU Emacs 24.4.91.1 (x86_64-apple-darwin13.4.0, Carbon Version 157
AppKit 1265.21)
of 2015-03-15 on Atago.local
Package: 11.88.3
I do not understand the behavior of LaTeX-fill-paragraph. It keeps annoying
me with partially filled paragraphs.
I always work with hard-wrapped paragraphs and hit M-q very often to rewrap
when I modify things.
But something seems weird with LaTeX-fill-paragraph perhaps related to $..$
material it finds.
Sample .tex file illustrating the problem:
-------------
\documentclass{article}
\begin{document}
% Sample paragraph
Without the separation axiom this does not work, for example let $V$ be an
infinite dimensional Banach space and let $X = V\cup\{*\}$, and let's declare
open the standard open $U\subset V$ as well as $X$ itself. This defines a
topology. The space is globally compact in the sense of coverings, but it
is not locally compact. Fortunately, it is not separated.
% Applying M-q (LaTeX-fill-paragraph) to the paragraph above we get:
Without the separation axiom this does not work, for example let $V$ be an
infinite dimensional Banach space and let $X =
V\cup\{*\}$, and let's declare open the standard open $U\subset V$ as well as
$X$ itself. This defines a topology. The space is globally compact in the sense
of coverings, but it is not locally compact. Fortunately, it is not separated.
% fill-column is 78
\end{document}
-------------
regards,
Jean-François
- bug#20296: 11.88.3; LaTeX-fill-paragraph gives unexpected result,
jfbu <=