Thinking about a solution to my previous question about switching between numerical and analytical "modes" in a large Mathematica project, I thought about the idea of using Context
as a scoping construct.
The basic idea is to make all numerical value assignments in their own context, e.g.
Begin["Global`Numerical`"]
par1 = 1;
par2 = 2;
...
End[]
and have all the complicated analytical functions, matrices, etc. in the Global context.
Ideally I would be able to work in the Global context and switch to everything being numeric with a simple Begin[Global'Numeric']
and switch back with End[]
.
Unfortunately this doen not work, since e.g. f[par1_,par2_,...] := foo
defined in the Global context will not use par1
, par2
, etc which have been defined in a sub context of Global.
Is there a way to make sub contexts inherit definitions from their parent context? Is there some other way to use contexts to create a simple switchable scope?
$ContextPath
, but it's a fragile hack. Personally, I haven't figured out a good way to use contexts for scoping, but I'm eager to see if others can suggest ideas.$ContextPath
isn't necessarily fragile, but you have to tread carefully. A good practice is to remember what it was before you modify it, and then set it back to the remembered value when you're leaving the "scope". You have to be careful to manageAbort
s and other evaluation interruptions, too. @Leo, You should post the answer since you brought it up first. =)Block
asBlock[{$ContextPath = newValue}, your code]
will automatically take care of many dangers mentioned by @Michael (no need to explicitly remember the old value, no need to worry about exceptions and Abort-s).