We discuss limit distributions of partial sums of bounded functions h of a long-memory moving-average process Xt=∑j=1 ∞ bjζ t-j with coefficients bj decaying as j-β, 1/2 < β < 1, and independent and ...

The known estimate $ \matrix\format\c\\ n \\ \sum \\ k=0 \endmatrix |a_{k}|=o((\text{log}n)^{\frac{1}{2}})$, (n → ∞), for univalent functions $f(z)= \matrix ...