Abstract
In this chapter we study convergence in distribution in settings involving sequences (S n : n = 1, 2,...), where for each n, S n = X 1+... + X n is the n th partial sum of a series of independent random variables. Our first result is that convergence in distribution of (S n ) is equivalent to a.s. convergence. Thereafter, we specialize to the case in which (X 1, X 2,...) is an iid sequence. Further limit theorems involving more general sums of independent random variables will be found in Chapter 16.
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