论文信息 - Strong law of large numbers and Shannon-McMillan theorem for Markov chain fields on trees

Strong law of large numbers and Shannon-McMillan theorem for Markov chain fields on trees

We study the strong law of large numbers and the Shannon-McMillan theorem for Markov chain fields on trees. First, we prove the strong law of large numbers for the frequencies of occurrence of states and ordered couples of states for Markov chain fields on trees. Then, we prove the Shannon-McMillan theorem with almost everywhere (a.e.) convergence for Markov chain fields on trees. We prove the results on a Bethe tree and then just state the analogous results on a rooted Cayley tree. In the proof, a new technique for establishing the strong limit theorem in probability theory is applied.

Weiguo Yang | Wen Liu | Weiguo Yang | Wen Liu

[1] Toby Berger,et al. Entropic aspects of random fields on trees , 1990, IEEE Trans. Inf. Theory.

[2] Liu Wen. Relative Entropy Densities and a Class of Limit Theorems of the Sequence of $m$-Valued Random Variables , 1990 .

[3] Robin Pemantle,et al. Automorphism Invariant Measures on Trees , 1992 .

[4] L. Wen,et al. An extension of Shannon-McMillan theorem and some limit properties for nonhomogeneous Markov chains , 1996 .

[5] F. Spitzer. Markov Random Fields on an Infinite Tree , 1975 .