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I'm a bit familiar with invariant and I can more or less find it for a small loops. I am so confused when solving invariant for the following pseudo-code for java. can anyone help please:

Input: an array A
i <- length(A)
# outer invariant
while i != 0 do
  k <- i
  j <- i - 1
  # inner invariant
  while j != 0 do
    if A[j] > A[k] then
      k <- j
    j <- j - 1
    # inner invariant
  swap(A, i, k)
  i <- i - 1
# outer invariant
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@dasblinkenlight can u help me with this too? this is confusing me –  Navid Koochooloo Jun 9 '13 at 11:24

2 Answers 2

Your code fragment can be reduced and formatted like the following (are you used to C language syntax?):

for ( i = n; i > 0 ; i -- ) {
    for ( j = i - 1 ; j > 0 ; j -- ) {
        // Constant time instructions here symbolized by c
    }
}

Passing to Sigma Notation won't be too cumbersome from the above fragment:

enter image description here

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You should work out the invariants of nested loops starting with the inner one:

while (j != 0) {
    if (A[j] > A[k]) {
        k = j;
    }
    j--;
}

you can observe that

A[k] >= A[x], for any (j < x) && (x <= i)

At the end of the loop, j == 0, so using Hoare Tripple for the while loop you can state that at the end of the inner loop

A[k] >= A[x], for any (0 < x <= i)

This is another way of saying that A[k] is MAX(A[0:i]).

Now you can proceed with the outer loop: since i proceeds from A.length down to zero, the invariant would be

A[y] < A[x], for any (y >= i) for any (y < x <= Length(A))

Using Hoare Trippe once again, you derive that upon exiting the outer loop the array A is sorted in ascending order:

A[y] < A[x], for any (y >= 0) for any (y < x <= Length(A))
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