List Recovery for Random Low-Rate Linear Codes

Abstract

We prove a list recovery guarantee for random low-rate linear codes over sufficiently large prime fields. For fixed dimension d, error fraction α, and accuracy parameter , a random d-dimensional linear code C ⊂eq Fpn is, with high probability, (α,,1+1-α)-list recoverable simultaneously for all input list sizes 2Oα, , d(n/ n). The proof is inspired by work of Matoušek, Př\'ıvětivý, and Škovroň on reconstructing point sets from their projections. It combines a deterministic graph-theoretic certificate, a nonvanishing determinant criterion, and the Schwartz--Zippel lemma. We also give a lower bound showing that any linear code C ⊂eq Fpn of dimension at least two cannot be (α,,1+1-α)-list recoverable for feasible list sizes ≥ 2Ωα, (n). In this sense, our result is nearly optimal.