Abstract
In this paper, based on the theory of regularly varying functions we study central limit theorems for the weighted sum $$S_n=\sum _{j=1}^{m_n}c_{nj}X_{nj}$$ , where $$(X_{nj};1\le j \le m_n,n\ge 1)$$ is a Hilbert-space-valued identically distributed martingale difference array and $$(c_{nj};1\le j \le m_n,n\ge 1)$$ is an array of real numbers. As an application, we present a central limit theorem for moving average processes of martingale differences.
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