List-Decoding Counterexamples Yield Lower Bounds on Mutual Correlated Agreement Error
Abstract
Mutual correlated agreement captures whether a random linear combination of received words can create a new large agreement with a code, a property relevant to the soundness of batched proximity testing. We show constructively that list-decoding counterexamples yield lower bounds on the mutual correlated agreement error. Given an explicit counterexample to the (p,L)-list-decodability of a linear code over Fq, we construct a related code C' of the same length and dimension such that errMCA(C',p)1q(L+1)qq+L, while decreasing its minimum distance by at most one. The construction also produces an explicit pair of words witnessing this error. We further give a structure-preserving version for code families whose coordinates are indexed by a finite set Ω, with each index determining a generator-matrix column through a map v:Ωqk. The construction changes at most one coordinate index and ensures that the output code remains in the same indexed family. As applications, we instantiate this principle for algebraic-geometry (AG) evaluation codes and Reed--Solomon codes. For AG codes, if G is the divisor defining the underlying Riemann--Roch space and N is the number of rational places outside supp(G) available for evaluation, the resulting code remains over the same function field and Riemann--Roch space, with a modified set of evaluation places. Its mutual correlated agreement error is at least 1q(L+1)NN+Ldeg G. The Reed--Solomon conclusion follows as the Vandermonde-column specialization.
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