Suppose I have the following boolean functions.

```
def Bottom():
return False
def implies(var1, var2):
if var1 == True and var2 == False: return False
return True
def land(var1, var2):
return var1 == True and var2 == True.
```

Is there an efficient algorithm which will take these three functions as input, and determine which (possibly multiple-application) functional composition of the first two functions will match the output of the third function for every Boolean (T,F) input to the third function?

I am using Python to write my example in, but I am not restricting solutions to Python or any programming language for that matter. In fact I am not actually looking for code, but more of a description of an algorithm or an explanation for why one does not exist.

As a side note, my motivation for trying to discover this algorithm is because I was asked to show Functional Completeness of a particular set of logical connectives, and we do this by showing that one logical connective can be emulated by a certain set of others. For logic, we have to use a little bit of guess and check, but I could not figure out a way to capture that in a program without a linear search over a large space of possibilities.

`false`

? Are you looking for something more efficient than exhaustive search (e.g., breadth-first search)? – Patrick87 Feb 15 '13 at 20:58