We prove a general structural theorem for a wide family of local algorithms, which includes property testers, local decoders, and PCPs of proximity. Namely, we show that the structure of every algorithm that makes q adaptive queries and satisfies a natural robustness condition admits a sample-based algorithm with n1−1/O(q2 log2 q) sample complexity. We also prove that this transformation is nearly optimal, and admits a scheme for constructing privacy-preserving local algorithms. Using the unified view that our structural theorem provides, we obtain the following results. • We strengthen the state-of-the-art lower bound for relaxed locally decodable codes, obtaining an exponential improvement on the dependency in query complexity; this...
Motivated by the structural analogies between point lattices and linear error-correcting codes, and ...
We give constructions of probabilistically checkable proofs (PCPs) of length n · polylog n proving s...
We show new hardness results for the class of Polynomial Local Search problems (PLS): - Hardness of...
We prove a general structural theorem for a wide family of local algorithms, which includes propert...
We study locally correctable and locally testable codes in the high rate regime. The tradeoff betwee...
In this work, we construct the first locally-correctable codes (LCCs), and locally-testable codes (L...
We continue the study of the trade-o between the length of PCPs and their query complexity, establi...
We consider the problem of constructing efficient locally decodable codes in the presence of a compu...
We initiate a systematic study of locally testable codes; that is, error-correcting codes that admit...
We survey known results regarding locally testable codes and locally testable proofs (known as PCPs)...
Abstract. A q-query locally testable code (LTC) is an error correcting code that can be tested by a ...
For a property P and a sub-property P ′, we say that P is P ′-partially testable with q queries if t...
Testing membership in lattices is of practical relevance, with applications to integer program- ming...
An error-correcting code is said to be locally decodable if a randomized algorithm can recover any s...
We show that random sparse binary linear codes are locally testable and locally decodable (under any...
Motivated by the structural analogies between point lattices and linear error-correcting codes, and ...
We give constructions of probabilistically checkable proofs (PCPs) of length n · polylog n proving s...
We show new hardness results for the class of Polynomial Local Search problems (PLS): - Hardness of...
We prove a general structural theorem for a wide family of local algorithms, which includes propert...
We study locally correctable and locally testable codes in the high rate regime. The tradeoff betwee...
In this work, we construct the first locally-correctable codes (LCCs), and locally-testable codes (L...
We continue the study of the trade-o between the length of PCPs and their query complexity, establi...
We consider the problem of constructing efficient locally decodable codes in the presence of a compu...
We initiate a systematic study of locally testable codes; that is, error-correcting codes that admit...
We survey known results regarding locally testable codes and locally testable proofs (known as PCPs)...
Abstract. A q-query locally testable code (LTC) is an error correcting code that can be tested by a ...
For a property P and a sub-property P ′, we say that P is P ′-partially testable with q queries if t...
Testing membership in lattices is of practical relevance, with applications to integer program- ming...
An error-correcting code is said to be locally decodable if a randomized algorithm can recover any s...
We show that random sparse binary linear codes are locally testable and locally decodable (under any...
Motivated by the structural analogies between point lattices and linear error-correcting codes, and ...
We give constructions of probabilistically checkable proofs (PCPs) of length n · polylog n proving s...
We show new hardness results for the class of Polynomial Local Search problems (PLS): - Hardness of...