Using the Smith-Waterman algorithm for a book homework assignment, I made up a table of values. Building the table was easy once I understood how the values are acquired, but now I'm having difficulty with determining the best alignment sequence from the table.
The table example was generated following the formula
min( (i+1, j+1)+penalty) (i+1, j)+2) (i, j+1)+2))
In the book pseudocode, penalty had a value of 0 if i==j and 1 otherwise.
The first 4 rows and columns look like this, with a penalty of 1 for a mismatch and 2 for a gap. :
14 12 10 8 15 13 11 9 16 14 12 10 17 15 13 11
According to the directions in the book, the method for determining the path are
- Start at array slot , in this case the value is 14
- Check slot . As we move left to the slot, a gap is inserted, thus adding 2 to the value, resulting in 14
- Check slot , and another gap is inserted resulting in a value of 17
- Check slot . As we move diagonally, the penalty value is added to to the slot value, giving a result of 14
Since I have two matching possibilities in  and , which is to be used for the next step?