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;
Sum
remains below (or at) a certain bound in both functions. They don't assert a concrete value ofSum
and do not prove anything regarding function's concrete result for a given inputN
other than a range. The OP just used a different (less conservative) bound inInefficientEuler1Sum
(based on arithmetic progression, very nice actually).