In this answer to a related question there's sample code in C that shows how to do subtraction via addition. The code sets the carry and overflow flags as well and contains a simple "test" that adds and subtracts a few numbers and prints the results. The numbers are 8-bit.
EDIT: Formal proof that one can use ADD instead of SUB for unsigned integers AND spot unsigned overflow/underflow as if from SUB.
Let's say we want to calculate
a - b, where
b are 4-bit unsigned integers and we want to perform subtraction via addition and get a 4-bit difference and an underflow/overflow indication when a < b.
a - b = a + (-b)
Since we're operating in modulo-16 arithmetic,
a - b = a + (-b) = a + (16 - b)
If we perform regular unsigned addition of
16-b the overflow condition for this addition, which is often indicated by the CPU in its
carry flag, will be this (recall that we're dealing with 4-bit integers):
a + (16 - b) > 15
Let's simplify this overflow condition:
a + 16 - b > 15
a + 16 > 15 + b
a + 1 > b
a > b - 1
Let's now recall that we're dealing with integers. Therefore the above can be rewritten as:
a >= b.
This is the condition for getting carry flag = 1 after adding
(16)-b. If the inequality doesn't hold, we get carry = 0.
Let's now recall that we were interested in overflow/underflow from subtraction (a - b). That condition is a < b.
Well, a >= b is the exact opposite of a < b.
From this it follows that the
carry flag that you get from adding
(16)-b is the inverse of the subtraction overflow, or, in other words, the inverse of the
borrow flag you'd get by subtracting
b directly from
a using the appropriate subtraction instruction (e.g. SUB).
Just invert the carry or treat it in the opposite way.