I've been struggling to find a way of calculating percentiles of a vector X given weights W that is continuous in W at zero. That is, as an element of W tends to zero, I would want the result of the percentile calculation to be the same as if the respective value of X had not been included in the initial vector. Can anyone suggest a weighted percentile algorithm that respects this property? Thanks.


You can solve this problem with simulation to get an answer that is correct in expectation.

Renormalize the weights to sum to 1, then draw n samples with replacement from X with probability W. Calculate the percentiles of the n samples, and you're finished. You'll need more n as max(W)/min(W) increases, but even drawing a ten million samples is fast on a modern machine.

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