English

On the Parallel Reconstruction from Pooled Data

Discrete Mathematics 2022-04-14 v4 Information Theory math.IT

Abstract

In the pooled data problem the goal is to efficiently reconstruct a binary signal from additive measurements. Given a signal σ{0,1}n\sigma \in \{ 0,1 \}^n, we can query multiple entries at once and get the total number of non-zero entries in the query as a result. We assume that queries are time-consuming and therefore focus on the setting where all queries are executed in parallel. For the regime where the signal is sparse such that σ1=o(n) || \sigma ||_1 = o(n) our results are twofold: First, we propose and analyze a simple and efficient greedy reconstruction algorithm. Secondly, we derive a sharp information-theoretic threshold for the minimum number of queries required to reconstruct σ\sigma with high probability. Our first result matches the performance guarantees of much more involved constructions (Karimi et al. 2019). Our second result extends a result of Alaoui et al. (2014) and Scarlett & Cevher (2017) who studied the pooled data problem for dense signals. Finally, our theoretical findings are complemented with empirical simulations. Our data not only confirm the information-theoretic thresholds but also hint at the practical applicability of our pooling scheme and the simple greedy reconstruction algorithm.

Keywords

Cite

@article{arxiv.1905.01458,
  title  = {On the Parallel Reconstruction from Pooled Data},
  author = {Oliver Gebhard and Max Hahn-Klimroth and Dominik Kaaser and Philipp Loick},
  journal= {arXiv preprint arXiv:1905.01458},
  year   = {2022}
}

Comments

Accepted at 36th IEEE International Parallel & Distributed Processing Symposium (IPDPS)

R2 v1 2026-06-23T08:56:54.328Z