Is there any faster method of matrix exponentiation to calculate M^n ( where M is a matrix and n is an integer ) than the simple divide and conquer algorithm.

You could factor the matrix into eigenvalues and eigenvectors. Then you get
Where V is the eigenvector matrix and D is a diagonal matrix. To raise this to the Nth power, you get something like:
Because all the V and V^1 terms cancel. Since D is diagonal, you just have to raise a bunch of (real) numbers to the nth power, rather than full matrices. You can do that in logarithmic time in n. Calculating eigenvalues and eigenvectors is r^3 (where r is the number of rows/columns of M). Depending on the relative sizes of r and n, this might be faster or not. 


It's quite simple to use Euler fast power algorith. Use next algorith.
Below please find equivalent for numbers:



Exponentiation by squaring is frequently used to get high powers of matrices. 


I would recommend approach used to calculate Fibbonacci sequence in matrix form. AFAIK, its efficiency is O(log(n)). 

