[PC-BSD Commits] r18772 - pbi/update

svn at pcbsd.org svn at pcbsd.org
Tue Sep 4 07:26:03 PDT 2012


Author: pbiapprove
Date: 2012-09-04 14:26:03 +0000 (Tue, 04 Sep 2012)
New Revision: 18772

Modified:
   pbi/update/pbi-meta-9
Log:
PBI-9 Meta-Update: EiskaltDCpp-Qt4

Modified: pbi/update/pbi-meta-9
===================================================================
--- pbi/update/pbi-meta-9	2012-09-04 14:22:00 UTC (rev 18771)
+++ pbi/update/pbi-meta-9	2012-09-04 14:26:03 UTC (rev 18772)
@@ -172,6 +172,7 @@
 App=Eclipse;Java;http://images.pbidir.com/progicons/eclipse.png;The Eclipse Foundation;http://www.eclipse.org;GPL;Graphical;development;Eclipse is an open source community, whose projects are focused on building an open development platform comprised of extensible frameworks, tools and runtimes for building, deploying and managing software across the lifecycle. The Eclipse Foundation is a not-for-profit, member supported corporation that hosts the Eclipse projects and helps cultivate both an open source community and an ecosystem of complementary products and services.;YES;
 App=Efax-gtk;Communications;http://images.pbidir.com/progicons/efax-gtk.png;Chris Vine;http://efax-gtk.sourceforge.net;GPL;Graphical;fax,email;This program is a Gtk+/Gtkmm front end for the efax program for receiving and sending faxes with a fax modem.  Any files to be faxed must be in postscript format, which is the generic printer format for Unix/Linux systems.  The program will use ghostscript to convert these into the Group 3 fax format which the fax modem will understand.;;
 App=EiskaltDC++;Network - P2P;http://images.pbidir.com/progicons/eiskaltdcpp.png;EiskaltDC++ Team;http://code.google.com/p/eiskaltdc/;GPL;Graphical;network,bittorrent,peer-to-peer;EiskaltDC++ is a cross-platform program that uses the Direct Connect and ADC protocol. It is compatible with other DC clients, such as the original DC from Neomodus, DC++ and derivatives. EiskaltDC++ also interoperates with all common DC hub software.;;
+App=EiskaltDCpp-Qt4;Network - P2P;http://images.pbidir.com/progicons/eiskaltdcpp.png;EiskaltDC++ Team;http://code.google.com/p/eiskaltdc/;GPL;Graphical;network,peer-to-peer,bittorrent;EiskaltDC++ is a cross-platform program that uses the Direct Connect and ADC protocol. It is compatible with other DC clients, such as the original DC from Neomodus, DC++ and derivatives. EiskaltDC++ also interoperates with all common DC hub software.  This port is Qt GUI that uses eiskaltdcpp-lib.;;
 App=Ekiga;Network;http://images.pbidir.com/progicons/ekiga.png;Ekiga Dev Team;http://www.ekiga.org;BSD;Graphical;voip,phone,gnomemeeting;Ekiga is a free Voice over IP phone allowing you to do free calls over the Internet.  Ekiga is the first Open Source application to support both H.323 and SIP, as well as audio and video. Ekiga was formerly known as GnomeMeeting.;;
 App=Emacs;Editors;http://images.pbidir.com/progicons/emacs.png;GNU;http://www.gnu.org/software/emacs/;GPL;Graphical;text,editor;GNU Emacs is a self-documenting, customizable, extensible real-time display editor.  Users new to Emacs will be able to use basic features fairly rapidly by studying the tutorial and using the self-documentation features. Emacs also has an extensive interactive manual browser.  It is easily extensible since its editing commands are written in Lisp.  GNU Emacs\'s many special packages handle mail reading (RMail) and sending (Mail), outline editing (Outline), compiling (Compile), running subshells within Emacs windows (Shell), running a Lisp read-eval-print loop (Lisp-Interaction-Mode), automated psychotherapy (Doctor :-) and many more.;;
 App=Emc2;Math;http://images.pbidir.com/progicons/emc2.png;Frederic Hecht;http://www.ann.jussieu.fr/~hecht/main.html;Other;Graphical;mesh,2D,CAD;Emc2 is a portable, interactive, graphical editor of two-dimensional mesh geometries. It can create and modify geometries (as in CAD), and define line discretizations, subdomains, and reference numbers (to take into account boundary conditions and material properties). Grid and Delaunay-Voronoi meshes composed of triangles or quadrilaterals can be regularized, rotated, and modified via the addition, removal, or moving of vertices.;;



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