Coq Proof General Originally written by Healfdene Goguen. Later contributions by Patrick Loiseleur, Pierre Courtieu, David Aspinall Status: supported Maintainer: Pierre Courtieu Coq version: 8.3 Coq homepage: http://coq.inria.fr/ =========================================================================== Coq Proof General has support for Unicode Tokens, using simple character sequences rather than a special language of tokens. See notes below. There is a tags program, coqtags. =========================================================================== Installation notes: Check the values of coq-tags and coq-prog-name in coq.el to see that they correspond to the paths for coqtop and the library on your system. Install coqtags in a standard place or add /coq to your PATH. NB: You may need to change the path to perl at the top of the file. Generate a TAGS file for the library by running coqtags `find . -name \*.v -print` in the root directory of the library, $COQTOP/theories. =========================================================================== Grammar for Unicode Tokens: Symbols include sequences naming Greek letters ("Lambda", "lambda", etc), connectives /\, \/, etc. See the token list (Unicode Tokens -> List Tokens) for tokens availabe --- these are just a sample set and you can add your own. See coq-unicode-tokens.el for the tables and further instructions. a symbol is encoded only if - preceded by _ or ' or some space or some symbol **and** - followed by _ or ' or some space or some symbol Grammar for sub/superscript: - a double _ introduces a subscript that ends at the first space - a double ^ introduces a superscript that ends at the first space - a , followed by { introduces a subscript expression that ends at the first } (_{...} was not possible due to coq notation mechanism) - a ^ followed by { introduces a superscript expression that ends at the first } See example-tokens.v in this directory for examples. See trac ticket http://proofgeneral.inf.ed.ac.uk/trac/ticket/313 to suggest fixes/changes/adjustments. ======================================== $Id$