I'm writing some linear algebra code (in Fortran 2003, but it would be the same issue in Fortran 90 or C) which requires a few work vectors to do computations in. My idea for dealing with this is to make a work array
w(:,:) which is private to the linear algebra module, i.e. a "hidden global" as defined in this discussion of why true global variables are awful.
I imagine this as having a big problem to solve on a blackboard, and for each part of the problem you pick an area of the blackboard to solve it on.
In keeping with that analogy, I could also have a bunch of small whiteboards: define a
work_array data type and pass them to the solvers as need be. (PETSc effectively uses this approach through another layer of abstraction; a
solver is a data type which includes some procedure pointers to the methods used as well as a few work vectors.) When there are nested calls from one solver to the other, this gets a mite complicated, so I like the first way better. It also doesn't require as much misdirection.
Any thoughts on which approach makes for better programming practice?
EDIT: I also don't think it'll be a problem when I start using OpenMP, which I've already done in an old incarnation of this code. Each thread only accesses its portion of the unknowns and not those of other threads after the problem is set up. Nonetheless, concurrency issues are probably a good reason not to use static variables generally.
If I have to keep dynamically allocating space for the scratch arrays every time I call a solver, which is often, won't that incur a lot of overhead?