I'm studying loop invariants at the moment and I have trouble with my choiche for an invariant for a linear search algorithm.
Inpput: A[1 ... n] of integers, k an integer value Output: true if k belongs to A[1 ... n] false otherwise LSearch(A,k) i := 1 found := false WHILE i<=n AND found=false DO IF A[i] = k THEN found := true i:=i+1 return found
The assertion which I choose is:
- found contains true or false if k is present among A and A[i]
Before the first iteration it holds because at that time in A is a single element and found is initialized to false.
After the loop i can be equal i := 1 found := falseto n and/or found can be true (while condition), so the assertion remain the same with the consideration of i<=n.
Do you think that this can be correct?