A PCP is a proof system for NP in which the proof can be checked by a probabilistic verifier. The verifier is only allowed to read a very small portion of the proof, and in return is allowed to err with some bounded probability. The probability that the verifier accepts a proof of a false claim is called the soundness error, and is an important parameter of a PCP system that one seeks to minimize. Constructing PCPs with sub-constant soundness error and, at the same time, a minimal number of queries into the proof (namely two) is especially important due to applications for inapproximability. In this work we construct such PCP verifiers, i.e., PCPs that make only two queries and have sub-constant soundness error. Our construction can be view...
The celebrated PCP Theorem states that any language in NP can be decided via a verifier that reads O...
We give constructions of probabilistically checkable proofs (PCPs) of length n · polylog n proving s...
We show a construction of a PCP with both sub-constant error and almost-linear size. Specifically, f...
A PCP is a proof system for NP in which the proof can be checked by a probabilistic verifier. The ve...
The PCP theorem (Arora et. al., J. ACM 45(1,3)) says that every NP-proof can be encoded to another p...
The error probability of Probabilistically Checkable Proof (PCP) systems can be made exponentially s...
Approximation algorithms have been studied to cope with computationally hard combinatorial problems ...
Parallel repetition refers to a set of valuable techniques used to reduce soundness error of probabi...
Probabilistically checkable proofs (PCPs) can be verified based only on a constant amount of random ...
] LUCA TREVISAN Abstract We study query-efficient Probabilistically Checkable Proofs (PCPs) and l...
The PCP Theorem is one of the most stunning results in computational complexity theory, a culminatio...
We show that every language in NP has a probabilistically checkable proof of proximity (i.e., proofs...
This paper establishes a new characterization of NP in terms of PCP, being the first such exact char...
This paper introduces a new consistency-test for a class of codes, referred to as geometric-codes, a...
This paper strengthens the low-error PCP characterization of NP, coming closer to the ultimate BGLR ...
The celebrated PCP Theorem states that any language in NP can be decided via a verifier that reads O...
We give constructions of probabilistically checkable proofs (PCPs) of length n · polylog n proving s...
We show a construction of a PCP with both sub-constant error and almost-linear size. Specifically, f...
A PCP is a proof system for NP in which the proof can be checked by a probabilistic verifier. The ve...
The PCP theorem (Arora et. al., J. ACM 45(1,3)) says that every NP-proof can be encoded to another p...
The error probability of Probabilistically Checkable Proof (PCP) systems can be made exponentially s...
Approximation algorithms have been studied to cope with computationally hard combinatorial problems ...
Parallel repetition refers to a set of valuable techniques used to reduce soundness error of probabi...
Probabilistically checkable proofs (PCPs) can be verified based only on a constant amount of random ...
] LUCA TREVISAN Abstract We study query-efficient Probabilistically Checkable Proofs (PCPs) and l...
The PCP Theorem is one of the most stunning results in computational complexity theory, a culminatio...
We show that every language in NP has a probabilistically checkable proof of proximity (i.e., proofs...
This paper establishes a new characterization of NP in terms of PCP, being the first such exact char...
This paper introduces a new consistency-test for a class of codes, referred to as geometric-codes, a...
This paper strengthens the low-error PCP characterization of NP, coming closer to the ultimate BGLR ...
The celebrated PCP Theorem states that any language in NP can be decided via a verifier that reads O...
We give constructions of probabilistically checkable proofs (PCPs) of length n · polylog n proving s...
We show a construction of a PCP with both sub-constant error and almost-linear size. Specifically, f...