On limit theorems for fields of martingale differences

Abstract

We prove a central limit theorem for stationary multiple (random) fields of martingale differences f Ti, i∈ Zd, where Ti is a Zd action. In most cases the multiple (random) fields of martingale differences is given by a completely commuting filtration. A central limit theorem proving convergence to a normal law has been known for Bernoulli random fields and in [V15] this result was extended to random fields where one of generating transformations is ergodic. In the present paper it is proved that a convergence takes place always and the limit law is a mixture of normal laws. If the Zd action is ergodic and d≥ 2, the limit law need not be normal. For proving the result mentioned above, a generalisation of McLeish's CLT for arrays (Xn,i) of martingale differences is used. More precisely, sufficient conditions for a CLT are found in the case when the sums Σi Xn,i2 converge only in distribution. The CLT is followed by a weak invariance principle. It is shown that central limit theorems and invariance principles using martingale approximation remain valid in the non-ergodic case.