I have to find the Number of N X M matrices containing a 1 in the top left entry, all entries are integer values and adjacent entries differ by at most 1, knowing that N is at most 5 and M can go up to 10^9. Obviously a backtracking algorithm is not fast enough, and i think that this problem can be solved using matrix exponentiation, but i do not have any ideea further this point. Thanks in advance!

Every row is in the following form:
The value of x doesn't really matter, so (for N = 5) there are 3^4 = 81 possibilities for each row. From here you write a simple program to determine which possibilities appear how often in the next row for each of these 81 possibilities in the current row. From there you should be able to figure out a formula if there is a simple one, otherwise you have a O(10^9) algorithm, which is at least better than what you started with. "at most" and "can go up to" does mess with the algorithm a bit. 

