From mboxrd@z Thu Jan 1 00:00:00 1970 X-Msuck: nntp://news.gmane.io/gmane.comp.tex.context/59719 Path: news.gmane.org!not-for-mail From: Otared Kavian Newsgroups: gmane.comp.tex.context Subject: Re: ssty feature is not activated for math Date: Fri, 18 Jun 2010 22:33:56 +0200 Message-ID: References: <20100618154340.GA15154@khaled-laptop> Reply-To: mailing list for ConTeXt users NNTP-Posting-Host: lo.gmane.org Mime-Version: 1.0 (Apple Message framework v1078) Content-Type: text/plain; charset="windows-1252" Content-Transfer-Encoding: quoted-printable X-Trace: dough.gmane.org 1276893254 344 80.91.229.12 (18 Jun 2010 20:34:14 GMT) X-Complaints-To: usenet@dough.gmane.org NNTP-Posting-Date: Fri, 18 Jun 2010 20:34:14 +0000 (UTC) To: mailing list for ConTeXt users Original-X-From: ntg-context-bounces@ntg.nl Fri Jun 18 22:34:13 2010 connect(): No such file or directory Return-path: Envelope-to: gctc-ntg-context-518@m.gmane.org Original-Received: from balder.ntg.nl ([195.12.62.10]) by lo.gmane.org with esmtp (Exim 4.69) (envelope-from ) id 1OPiGS-00040a-9c for gctc-ntg-context-518@m.gmane.org; Fri, 18 Jun 2010 22:34:12 +0200 Original-Received: from localhost (localhost [127.0.0.1]) by balder.ntg.nl (Postfix) with ESMTP id CD327C9BDC; Fri, 18 Jun 2010 22:34:11 +0200 (CEST) X-Virus-Scanned: Debian amavisd-new at balder.ntg.nl Original-Received: from balder.ntg.nl ([127.0.0.1]) by localhost (balder.ntg.nl [127.0.0.1]) (amavisd-new, port 10024) with LMTP id 8GocB-OPMS5q; Fri, 18 Jun 2010 22:34:09 +0200 (CEST) Original-Received: from balder.ntg.nl (localhost [127.0.0.1]) by balder.ntg.nl (Postfix) with ESMTP id E5CFBC9BBC; Fri, 18 Jun 2010 22:34:08 +0200 (CEST) Original-Received: from localhost (localhost [127.0.0.1]) by balder.ntg.nl (Postfix) with ESMTP id C134FC9BBC for ; Fri, 18 Jun 2010 22:34:06 +0200 (CEST) X-Virus-Scanned: Debian amavisd-new at balder.ntg.nl Original-Received: from balder.ntg.nl ([127.0.0.1]) by localhost (balder.ntg.nl [127.0.0.1]) (amavisd-new, port 10024) with LMTP id Em1BaqNf7l4C for ; Fri, 18 Jun 2010 22:34:00 +0200 (CEST) Original-Received: from mail-wy0-f169.google.com (mail-wy0-f169.google.com [74.125.82.169]) by balder.ntg.nl (Postfix) with ESMTP id E3F89C9B92 for ; Fri, 18 Jun 2010 22:34:00 +0200 (CEST) Original-Received: by wyf28 with SMTP id 28so1297421wyf.14 for ; Fri, 18 Jun 2010 13:34:00 -0700 (PDT) DKIM-Signature: v=1; a=rsa-sha256; c=relaxed/relaxed; d=gmail.com; s=gamma; h=domainkey-signature:received:received:content-type:mime-version :subject:from:in-reply-to:date:content-transfer-encoding:message-id :references:to:x-mailer; bh=iRACCDZQWNeH3s7MRuwsbn1vkNaZZqcinwCAMM6Sh2g=; b=oTKPC0mvS48kGKNHz2KrtaTx2YSG38bzbVkhZ/LkOLTsjxfcMFJMMS7okJqU61NmkT STsHx4dEvGhZHHBMKp2k5ROnXJOvJjNrAt+NMgd0TUNcK/qVQ+O3wv7fh37t2ZHQc7YP 0xwskh+m/9/W2fSF6bfXG18qX6F7mKyveqSls= DomainKey-Signature: a=rsa-sha1; c=nofws; d=gmail.com; s=gamma; h=content-type:mime-version:subject:from:in-reply-to:date :content-transfer-encoding:message-id:references:to:x-mailer; b=Q0Rco5vjkEg57QaQRoz5IJImhSv1Lf/nrukMGrGP/Wut5Xe3mr/7i1IedpaRMJAqj4 lCAYpfdxhLCXeu0FdGaMFXNF5ClRSDVsKhRbRsCuLrgwNOg3tZAjV9qifeHHNXuCOTEu V687Xlqj89rtH3fqWSZTwy5M0KFN0cCX8GcQ8= Original-Received: by 10.227.133.65 with SMTP id e1mr1546988wbt.76.1276893240527; Fri, 18 Jun 2010 13:34:00 -0700 (PDT) Original-Received: from [192.168.0.11] (mna75-3-82-66-231-76.fbx.proxad.net [82.66.231.76]) by mx.google.com with ESMTPS id t15sm20354010wbc.11.2010.06.18.13.33.59 (version=TLSv1/SSLv3 cipher=RC4-MD5); Fri, 18 Jun 2010 13:33:59 -0700 (PDT) In-Reply-To: <20100618154340.GA15154@khaled-laptop> X-Mailer: Apple Mail (2.1078) X-BeenThere: ntg-context@ntg.nl X-Mailman-Version: 2.1.12 Precedence: list List-Id: mailing list for ConTeXt users List-Unsubscribe: , List-Archive: List-Post: List-Help: List-Subscribe: , Original-Sender: ntg-context-bounces@ntg.nl Errors-To: ntg-context-bounces@ntg.nl Xref: news.gmane.org gmane.comp.tex.context:59719 Archived-At: On 18 juin 2010, at 17:43, Khaled Hosny wrote: > Compare the size of the primes with xits, cambria and modern, only the > later is correct. Hi Khaled, Hi Hans, Thank you so much to bith of you and all other people involved in the proje= ct for giving us so rapidly the ability to use stix, and xits, fonts. I tried for a week or so both stix and xits fonts on many of the documents = I have in ConTeXt. I can say that as far as simple text is concerned everyt= hing works like a charm. However, regarding stix and xits there are some is= sues with math mode: =95 With stix fonts, the integral sign doesn't scale up correctly, and the = placement and maybe the sizes of the indices and derivative signs are incor= rect. =95 With xits fonts, the integral sign is correct but the placement of the = indices and exponents are not always correct (see the example below). Also = for some reasons the greek letters are not anymore italicized. I have also a question regarding the use of calligraphic script style, like= the font rsfs, which are contained in xits and stix: how can one use them? With my best regards: OK %%% file xits-sample.tex \usetypescript[xits] \let\|\Vert \starttext \startbuffer[math-sample] Let $\alpha \in {\Bbb R}$. Then $z:=3D{\rm e}^{{\rm i}\alpha} \in {\Bbb C}$= and $|z|=3D1$. Let ${\ss\bf H}$ be a Hilbert space. In the case where ${\s= s\bf H} =3D H^1_{0}(\Omega)$, the classical Sobolev space on a smooth bound= ed domain $\Omega \subset {\Bbb R}^n$, we have the Poincar=E9 inequality st= ating that \startformula \lambda_{1}\int_{\Omega}u(x)^2dx =3D: \lambda_{1}\| u\|^2 \leq \| \nabla u = \|^2 :=3D \int_{\Omega}|\nabla u(x)|^2dx. \stopformula In particular if $n=3D1$ and $\Omega =3D (0,1)$ \startformula \pi^2\int_{0}^{1} u(x)^2dx \leq \int_{0}^1u'(x)^2dx. \qquad \zeta(2)=3D\sum_{n=3D1}^\infty {1\over n^2 } =3D{\pi^2\over 6} \stopformula On the other hand $\int_{1}^{2} xdx=3D3/2$, while $\zeta(4)=3D\sum_{n=3D1}^= \infty n^{-4} =3D \pi^4/ 90$. A function $f$ is said to have a derivative at $x_{0}\in {\Bbb R}$, if the = limite \startformula \lim_{h \to 0}{f(x_{0}+h) - f(x_{0})\over h} = \stopformula exists. In this case the above limit is denoted $f'(x_{0})$. One can easily= see that $(uf)'=3Du'f+uf'$ (and not $u'f'$\dots). \startformula \Delta u :=3D \sum_{j=3D1}^n {\partial^2 u\over \partial x_{j}^2 } =3D \sum= _{j=3D1}^n \partial_{jj}u. \stopformula \stopbuffer This is a sample of maths with Latin Modern: \getbuffer[math-sample] \start \switchtobodyfont[xits] This is a sample of Xits fonts\dots{} Version 1.002. Note that the integral= sign and the numbers 1 and 2 are not correctly placed in $\int_{1}^2$, and= $\Omega$ in $\int_{\Omega}$ is a little bit far from the integral sign $\i= nt$. Also the derivative sign in $f'$ is slightly misplaced (actually too h= igh), but this may be accepted as it is. \getbuffer[math-sample] \stop \stoptext %%%% end file xits-sample.tex ___________________________________________________________________________= ________ If your question is of interest to others as well, please add an entry to t= he Wiki! maillist : ntg-context@ntg.nl / http://www.ntg.nl/mailman/listinfo/ntg-cont= ext webpage : http://www.pragma-ade.nl / http://tex.aanhet.net archive : http://foundry.supelec.fr/projects/contextrev/ wiki : http://contextgarden.net ___________________________________________________________________________= ________