We give computationally efficient zero-knowledge proofs of knowledge for arithmetic circuit satisfiability over a large field. For a circuit with N addition and multiplication gates, the prover only uses O(N) multiplications and the verifier only uses O(N) additions in the field. If the commitments we use are statistically binding, our zero-knowledge proofs have unconditional soundness, while if the commitments are statistically hiding we get computational soundness. Our zero-knowledge proofs also have sub-linear communication if the commitment scheme is compact. Our construction proceeds in three steps. First, we give a zero-knowledge proof for arithmetic circuit satisfiability in an ideal linear commitment model where the prover may comm...
We construct a perfectly binding string commitment scheme whose security is based on the learning pa...
International audienceThis paper constructs efficient non-interactive arguments for correct evaluati...
There has been a lot of recent progress in constructing efficient zero-knowledge proofs for showing ...
We propose the first zero-knowledge argument with sub-linear communication complexity for arithmetic...
We present zero-knowledge proofs and arguments for arithmetic circuits over finite prime fields, nam...
Efficient zero-knowledge (ZK) proofs for arbitrary boolean or arithmetic circuits have recently attr...
There have been tremendous advances in reducing interaction, communication and verification time in ...
We provide a zero-knowledge argument for arithmetic circuit satisfiability with a communication comp...
Zero-knowledge proof is a powerful cryptographic primitive that has found various applications in th...
A zero-knowledge proof is a fundamental cryptographic primitive that enables the verification of sta...
Interactive oracle proofs (IOPs) are a multi-round generalization of probabilistically checkable pro...
We present a zero-knowledge proof system [19] for any NP language L, whichallows showing that x in L...
We introduce and study a simple kind of proof system called line-point zero knowledge (LPZK). In an ...
Abstract. Even though Zero-knowledge has existed for more than 30 years, few generic constructions f...
We construct a perfectly binding string commitment scheme whose security is based on the learning pa...
We construct a perfectly binding string commitment scheme whose security is based on the learning pa...
International audienceThis paper constructs efficient non-interactive arguments for correct evaluati...
There has been a lot of recent progress in constructing efficient zero-knowledge proofs for showing ...
We propose the first zero-knowledge argument with sub-linear communication complexity for arithmetic...
We present zero-knowledge proofs and arguments for arithmetic circuits over finite prime fields, nam...
Efficient zero-knowledge (ZK) proofs for arbitrary boolean or arithmetic circuits have recently attr...
There have been tremendous advances in reducing interaction, communication and verification time in ...
We provide a zero-knowledge argument for arithmetic circuit satisfiability with a communication comp...
Zero-knowledge proof is a powerful cryptographic primitive that has found various applications in th...
A zero-knowledge proof is a fundamental cryptographic primitive that enables the verification of sta...
Interactive oracle proofs (IOPs) are a multi-round generalization of probabilistically checkable pro...
We present a zero-knowledge proof system [19] for any NP language L, whichallows showing that x in L...
We introduce and study a simple kind of proof system called line-point zero knowledge (LPZK). In an ...
Abstract. Even though Zero-knowledge has existed for more than 30 years, few generic constructions f...
We construct a perfectly binding string commitment scheme whose security is based on the learning pa...
We construct a perfectly binding string commitment scheme whose security is based on the learning pa...
International audienceThis paper constructs efficient non-interactive arguments for correct evaluati...
There has been a lot of recent progress in constructing efficient zero-knowledge proofs for showing ...