These are wrappers for retroarch wrappers, they are needed since launching a
process from XBMC(as a display manager and probably otherwise), using
AdvancedLauncher, results in it and it's parent recieving the same gamepad
input.
These wrappers will produce no sound on XBMC and AdvancedLauncher setups not
using a sound daemon, since XBMC gets paused while still holding onto the sound
device.
Now, Bochs expression has a bunch of configurable options!
Unhappily, it is a big and complex project, and some configure options
are in constant clash. But the set created for now is very usable and
stable.
Closes#4366
Let’s compile the Mac OS X SecurityTool ourselves
copumpkin:
This allows us to compile SecurityTool ourselves. There are several more
Apple opensource projects that can be compiled this way that I'll slowly
add.
Remaining sources of impurity:
Reference to absolute path to Xcode. This should be integrated with the
xcode derivation (and the iOS wrapper chain that exists under mobile
development) but it's not obvious how to do that yet.
Absolute reference to xcodebuild.
Adding this should make it possible for #3629 to work reasonably
cleanly.
Now we can parametrize Higan locally.
By default, guiToolkit = "gtk" and profile = "performance" (the accuracy
profile is seriously slow on my machine :) )
Closes#4340
Sound of Sorting is an array-sorting visual+sound demo program.
It shows an array as a list of horizontal bars, and realizes a
step-by-step sorting of it. Moreover, it colorizes and emits a
"8-bit-game-like" sound throughout its execution.
Closes#4341
Containers is a reimplementation of the FSets/FMaps library from the
standard library, using typeclasses.
Homepage: http://coq.inria.fr/pylons/pylons/contribs/view/Containers/v8.4
The Mathematical Components (mathcomp) contains advanced theory files
covering a wide spectrum of mathematics.
Homepage: http://ssr.msr-inria.inria.fr/
Ssreflect is a proof language (plugin for Coq) and a small set of core
theory libraries about boolean, natural numbers, sequences, decidable
equality and finite types.
Homepage: http://ssr.msr-inria.inria.fr/