# GNATprove: “postcondition might fail” in simple function

I want to write a simple function that finds the biggest number in given Integer array. Here is specification:

``````package Maximum with SPARK_Mode is

type Vector is array(Integer range <>) of Integer;

function Maximum (A : in Vector) return Integer
with
SPARK_Mode,
Pre => A'Length > 0,
Post =>
(for all i in A'Range => A(i) <= Maximum'Result)
and then
(for some i in A'Range => A(i) = Maximum'Result);

end Maximum;
``````

And here is function's body:

``````package body Maximum with SPARK_Mode is

function Maximum (A : in Vector) return Integer
is
Max : Integer := A (A'First);
begin
if (A'Length = 1) then
return Max;
end if;

for I in A'First + 1 .. A'Last loop
pragma Loop_Invariant
(for all Index in A'First .. I - 1 => Max >= A(Index));

if A (I) > Max then
Max := A (I);
end if;
end loop;

return Max;
end Maximum;

end Maximum;
``````

And when I try to prove this function with SPARK, it says that postcondition might fail. I'm trying to understand this for like 5 hours now and I have no idea why it says so. It's really annoying, this function MUST work. Do you have any idea why SPARK behaves so strange? What is a data example for this function to not fullfil its postcondition? It always returns a value taken directly from given array and it is always maximal.

• Notice that gnatprove says "might". It doesn't mean that it has a counter-example. It only means that it can't prove that the postcondition is fulfilled. – Jacob Sparre Andersen Oct 23 '15 at 9:13

Your mistake is to make a loop invariant, which is weaker than the postcondition:

Specification:

``````package Maximum
with SPARK_Mode
is

type Vector is array (Integer range <>) of Integer;

function Maximum (A : in Vector) return Integer
with
Pre  => A'Length > 0,
Post => (for all i in A'Range => A(i) <= Maximum'Result)
and
(for some i in A'Range => A(i) = Maximum'Result);

end Maximum;
``````

Implementation:

``````package body Maximum with SPARK_Mode is

function Maximum (A : in Vector) return Integer
is
Max : Integer := A (A'First);
begin
if (A'Length = 1) then
return Max;
end if;

for K in A'First + 1 .. A'Last loop
pragma Loop_Invariant
((for all  I in A'First .. K - 1 => A (I) <= Max)
and
(for some I in A'First .. K - 1 => A (I) = Max));

if A (K) > Max then
Max := A (K);
end if;
end loop;

return Max;
end Maximum;

end Maximum;
``````

Project file:

``````project Maximum is
for Main use ("maximum");
end Maximum;
``````
• Yes, yes, thank you! I figured it out a few hours after I asked this question anyway but I'm glad to see someone actually giving a good answer (I had like 5 views 3 hours after posting this). These SPARK's messages are very misleading by the way. – Android developer Oct 24 '15 at 3:30
• I typically only check out questions, when I get my daily summary of new questions, so getting a response from me before 24 hours have passed is fast. – Jacob Sparre Andersen Oct 24 '15 at 13:43