The square root rule for adaptive importance sampling

Abstract

In adaptive importance sampling, and other contexts, we have K>1 unbiased and uncorrelated estimates μk of a common quantity μ. The optimal unbiased linear combination weights them inversely to their variances but those weights are unknown and hard to estimate. A simple deterministic square root rule based on a working model that Var(μk) k-1/2 gives an unbisaed estimate of μ that is nearly optimal under a wide range of alternative variance patterns. We show that if Var(μk) k-y for an unknown rate parameter y∈ [0,1] then the square root rule yields the optimal variance rate with a constant that is too large by at most 9/8 for any 0 y 1 and any number K of estimates. Numerical work shows that rule is similarly robust to some other patterns with mildly decreasing variance as k increases.