I have a set of 5000 strings of length 4, where each character in the string can be either A, B, C, or D.

0-order Markov Chain (no dependency), makes a 4*1 array of columns A, B, C, D.

1-order Markov Chain (pos j depends on previous pos i), makes a 4*4 matrix of rows Ai, Bi, Ci, Di; and columns of Aj, Bj, Cj, Dj.

2-order Markov Chain (pos k depends on pos j and pos i), makes a 4*4*4 matrix of dimensions Ai, Bi, Ci, Di; Aj, Bj, Cj, Dj; and Ak, Bk, Ck, Dk [or this makes a 16*4 matrix of dimensions Aij, Bij, Cij, Dij; Ak, Bk, Ck, Dk].

3-order Markov Chain (pos l depends on pos k, pos j, and pos i), makes a 4*4*4*4 matrix of dimensions Ai, Bi, Ci, Di; Aj, Bj, Cj, Dj; Ak, Bk, Ck, Dk; Al, Bl, Cl, Dl [or this makes a 64*4 matrix of dimensions Aijk, Bijk, Cijk, Dijk; Al, Bl, Cl, Dl].

What are the number of parameters for the 4 orders? I have a few ideas, but want to see what others think. Thank you for any advice!!

`4*1`

,`4*4`

,`4*4*4`

, and`4*4*4*4`

in your question, so you're basically all the way there, aren't you? The only thing left is that the 1-order, 2-order, and 3-order also need 4 starting probabilities. – David Robinson Apr 20 '13 at 4:14`4*1`

case would only have`3`

degrees of freedom if you consume one (say, by normalizing to make a probability distribution.) In the other scenarios, you will lose one degree of freedom for every distribution you choose to normalize. – phs Apr 20 '13 at 5:02