In implementing most algorithms (sort, search, graph traversal, etc.), there is frequently a trade-off that can be made in reducing memory accesses at the cost of additional ordinary operations.
Knuth has a useful method for comparing the complexity of various algorithm implementations by abstracting it from particular processors and only distinguishing between ordinary operations (oops) and memory operations (mems).
In compiled programs, one typically lets the compiler organise the low level operations, and hopes that the operating system will handle the question of whether data is held in cache memory (faster) or in virtual memory (slower). Furthermore, the exact number / cost of instructions is encapsulated by the compiler.
With Forth, there is no longer such encapsulation, and one is much closer to the machine, albeit perhaps to a stack machine running on top of a register processor.
Ignoring the effect of an operating system (so no memory stalls, etc.), and assuming for the moment a simple processor,
(1) Can anyone advise on how the ordinary stack operations in Forth (e.g. dup, rot, over, swap, etc.) compare with the cost of Forth's memory access fetch (@) or store (!) ?
(2) Is there a rule of thumb I can use to decide how many ordinary operations to trade-off against saving a memory access?
What I'm looking for is something like 'memory access costs as much as 50 ordinary ops, or 500 ordinary ops, or 5 ordinary ops' Ballpark is absolutely fine.
I'm trying to get a sense of the relative expense of fetch and store vs. rot, swap, dup, drop, over, correct to an order of magnitude.