Not sure what you mean by "but should decrease less than the smaller value" - this seems to indicate it's *not* pro-rata, especially if the ratios are maintained only in one direction.

Assuming that's a mistake, the way to pro-rata the non-moving values `b`

and `c`

is simply to maintain their ratio when the moving value `a`

changes, something like:

```
a = 50, b = 30, c = 20 # initial values
aDelta = 10 # how much to change 'a' by
bDelta = -aDelta * b / (b + c) # bDelta <- -6
cDelta = -aDelta - bDelta # cDelta <- -4
a = a + aDelta # a <- 60
b = b + bDelta # b <- 24
c = c + cDelta # c <- 16
```

You can see there that the ratio remains the same between `b`

and `c`

(`30:20`

and `24:16`

are both `3:2`

), at least until the values get small enough for rounding errors to come into play (reducing them, then increasing them may not give you back the exact values you started with).

If that's important, you could consider using floating point for the values and simply turn them into integers as a final step.