Moderate deviations for martingales and mixing random processes

We obtain a moderately large deviation theorem for martingales. Then this result is applied to prove that the empirical measures of a stationary phi-mixing sequence of random variables satisfy moderately large deviation principle when Sigma(n=1)((+infinity (n) < + infinity. Another application shows that the empirical measures of a Markov process obey uniformly moderately large deviation principle under Doeblin recurrence.