Support Consistency of Direct Sparse-Change Learning in Markov Networks
share
We study the problem of learning sparse structure changes between two Markov networks P and Q. Rather than fitting two Markov networks separately to two sets of data and figuring out their differences, a recent work proposed to learn changes directly via estimating the ratio between two Markov network models. In this paper, we give sufficient conditions for successful change detection with respect to the sample size n_p, n_q, the dimension of data m, and the number of changed edges d. When using an unbounded density ratio model we prove that the true sparse changes can be consistently identified for n_p = Ω(d^2 m^2+m/2) and n_q = Ω(n_p^2), with an exponentially decaying upper-bound on learning error. Such sample complexity can be improved to (n_p, n_q) = Ω(d^2 m^2+m/2) when the boundedness of the density ratio model is assumed. Our theoretical guarantee can be applied to a wide range of discrete/continuous Markov networks.
READ FULL TEXT