I have two functions: InefficientEuler1Sum and InefficientEuler1Sum2. I want to prove that they both are equivalent (same output given same input).
When I run SPARK -> Prove File (in GNAT Studio), I get such messages about line `pragma Loop_Invariant(Sum = InefficientEuler1Sum(I));`

in the file euler1.adb:

`loop invariant might fail in first iteration`

`loop invariant might not be preserved by an arbitrary iteration`

It seems (for example, when trying manual proof) that function InefficientEuler1Sum2 has no idea about structure of InefficientEuler1Sum. What's the best way to give this information to it?

File euler1.ads:

```
package Euler1 with
SPARK_Mode
is
function InefficientEuler1Sum (N: Natural) return Natural with
Ghost,
Pre => (N <= 1000);
function InefficientEuler1Sum2 (N: Natural) return Natural with
Ghost,
Pre => (N <= 1000),
Post => (InefficientEuler1Sum2'Result = InefficientEuler1Sum (N));
end Euler1;
```

File euler1.adb:

```
package body Euler1 with
SPARK_Mode
is
function InefficientEuler1Sum(N: Natural) return Natural is
Sum: Natural := 0;
begin
for I in 0..N loop
if I mod 3 = 0 or I mod 5 = 0 then
Sum := Sum + I;
end if;
pragma Loop_Invariant(Sum <= I * (I + 1) / 2);
end loop;
return Sum;
end InefficientEuler1Sum;
function InefficientEuler1Sum2 (N: Natural) return Natural is
Sum: Natural := 0;
begin
for I in 0..N loop
if I mod 3 = 0 then
Sum := Sum + I;
end if;
if I mod 5 = 0 then
Sum := Sum + I;
end if;
if I mod 15 = 0 then
Sum := Sum - I;
end if;
pragma Loop_Invariant(Sum <= 2 * I * I);
pragma Loop_Invariant(Sum = InefficientEuler1Sum(I));
end loop;
return Sum;
end InefficientEuler1Sum2;
end Euler1;
```

notclear "that the two functions will often produce different results". The loop invariants assert that the value of`Sum`

remains below (or at) a certain bound in both functions. They don't assert a concrete value of`Sum`

and do not prove anything regarding function's concrete result for a given input`N`

other than a range. The OP just used a different (less conservative) bound in`InefficientEuler1Sum`

(based on arithmetic progression, very nice actually). – DeeDee Nov 9 at 21:51