Assume:

only 4 letters (a, b, c, d) are used

Say I have a dictionary comprise of occurrences(>=0) of the 4 letters

```
d = {"a":1, "b":2, "c":1, "d":3}
```

and I am given a "steps" number.

I want to find all the dictionaries that are possible given a "steps" number of occurrence subtractions.

For example

```
# given the above dictionary and a steps of 2
moo = {"a":1, "b":1, "c":1, "d":2}
# moo is a possibility because I simply took away 1 b and 1 d
# how do I find all the possibilities? (note: occurrences cannot be negative)
```

edit: steps as in exactly 2 steps

Note: I want to find all the "moo"s, or all the dictionaries that are possible given a reference dictionary and a number of steps. I don't care about testing if two dictionaries meet the steps requirement.

I think I came up with some recursive code to solve this problem:

```
def genDict(d, steps):
if steps == 0:
return [d]
dList = []
for key, value in d.items():
if value > 0:
temp = dict(d)
temp[key] = value -1
dList += genDict(temp, steps-1)
return dList
```

Anyone got a non-recursive solution that won't hog up memory?