Find minimal polynomial of Galois field element
pl = minpol(x)
pl = minpol(x) finds the minimal polynomial of each element in the Galois column vector, x. The output pl is an array in GF(2). The kth row of pl lists the coefficients, in order of descending powers, of the minimal polynomial of the kth element of x.
The code below uses m = 4 and finds that the minimal polynomial of gf(2,m) is just the primitive polynomial used for the field GF(2^m). This is true for any value of m, not just the value used in the example.
m = 4; A = gf(2,m) pl = minpol(A)
The output is below. Notice that the row vector [1 0 0 1 1] represents the polynomial D^4 + D + 1.
A = GF(2^4) array. Primitive polynomial = D^4+D+1 (19 decimal) Array elements = 2 pl = GF(2) array. Array elements = 1 0 0 1 1
Another example is in Minimal Polynomials.