Sharp Threshold for the Convergence of Nonstationary Averaging
Abstract
We study non-stationary averaging processes, where each term of a sequence is a weighted average of previous terms, namely an+1 = Σj=1n pn(j) aj. Our results extend classical theory in two distinct regimes. First, we prove a sharp threshold for convergence in the regime where the weights are bounded between two envelopes ( n)-α npn(·) ≤ ( n)β. We show that the sequence necessarily converges when α + β / 2 ≤ 1, while α + β / 2 > 1 the convergence can fail. Second, we study complementary fixed shape regime, when pn is obtained by a fixed limiting density on (0,1). We show that under mild regularity assumptions, the sequence converges.
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