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Density estimation from batched broken random samples

Published 10 Feb 2026 in math.ST | (2602.09833v1)

Abstract: The broken random sample problem was first introduced by DeGroot, Feder, and Gole (1971, Ann. Math. Statist.): in each observation (batch), a random sample of $M$ i.i.d. point pairs $ ((X_i,Y_i)){i=1}M$ is drawn from a joint distribution with density $p(x,y)$, but we can observe only the unordered multisets $(X_i){i=1}M$ and $(Y_i)_{i=1}M$ separately; that is, the pairing information is lost. For large $M$, inferring $p$ from a single observation has been shown to be essentially impossible. In this paper, we propose a parametric method based on a pseudo-log-likelihood to estimate $p$ from $N$ i.i.d. broken sample batches, and we prove a fast convergence rate in $N$ for our estimator that is uniform in $M$, under mild assumptions.

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