The law of the iterated logarithm of random weighting approximation for mean error—Non. I. I. D. situation

We apply a general result on the law of iterated logarithm to the wavelet transforms of i.i.d. random variables and show that a version of this law holds under some regularity conditions on the wavelet. This result provides asymptotic estimates of the rate of decay of the wavelet coe cients at inter

## Let {x,x~ ; n >\\_ 1} be a sequence of i.i.d, random variables. Set Sn = X1 + X2 + • .. +Xn and M,~ = maxk 1. By using the strong approximation method, we obtain that for any -1 if and only if EX = 0 and EX 2 < oo, which strengthen and extend the result of Gut and Sp~taru [1], where N is the stan

The paper proves a functional local law of the iterated logarithm and a moderate deviation principle for properly normalized geometrically weighted random series of centered independent normal real random variables with variances satisfying Kolmogorov's conditions. The methodology used here allows a