We propose a practical zero-knowledge proof system for proving knowledge of short solutions s, e to linear relations A s + e= u mod q which gives the most efficient solution for two naturally-occurring classes of problems. The first is when A is very ``tall\u27\u27, which corresponds to a large number of LWE instances that use the same secret s. In this case, we show that the proof size is independent of the height of the matrix (and thus the length of the error vector e) and rather only linearly depends on the length of s. The second case is when A is of the form A\u27 tensor I, which corresponds to proving many LWE instances (with different secrets) that use the same samples A\u27. The length of this second proof is square root in the...
In applications of fully-homomorphic encryption (FHE) that involve computation on encryptions produc...
We give computationally efficient zero-knowledge proofs of knowledge for arithmetic circuit satisfia...
In this work we introduce a new hard problem in lattices called Isometric Lattice Problem (ILP) and ...
For a public value $y$ and a linear function $f$, giving a zero-knowledge proof of knowledge of a se...
There has been a lot of recent progress in constructing efficient zero-knowledge proofs for showing ...
We propose a new zero-knowledge protocol for proving knowledge of short preimages under additively h...
A key component of many lattice-based protocols is a zeroknowledge proof of knowledge of a vector ~s...
In preparation for the eventual arrival of quantum computers, there has been a significant amount of...
This PhD thesis is about practical lattice-based zero-knowledge proof systems. We construct protocol...
We present efficient Zero-Knowledge Proofs of Knowledge (ZKPoK) for linear and multiplicative relati...
Zero-Knowledge proof is a very basic and important primitive, which allows a prover to prove some st...
Lattice-based cryptography is one of the most active research topics in cryptography in recent years...
We construct a practical lattice-based zero-knowledge argument for proving multiplicative relations ...
We propose a general technique that allows improving the complexity of zero-knowledge protocols for ...
We propose the first zero-knowledge argument with sub-linear communication complexity for arithmetic...
In applications of fully-homomorphic encryption (FHE) that involve computation on encryptions produc...
We give computationally efficient zero-knowledge proofs of knowledge for arithmetic circuit satisfia...
In this work we introduce a new hard problem in lattices called Isometric Lattice Problem (ILP) and ...
For a public value $y$ and a linear function $f$, giving a zero-knowledge proof of knowledge of a se...
There has been a lot of recent progress in constructing efficient zero-knowledge proofs for showing ...
We propose a new zero-knowledge protocol for proving knowledge of short preimages under additively h...
A key component of many lattice-based protocols is a zeroknowledge proof of knowledge of a vector ~s...
In preparation for the eventual arrival of quantum computers, there has been a significant amount of...
This PhD thesis is about practical lattice-based zero-knowledge proof systems. We construct protocol...
We present efficient Zero-Knowledge Proofs of Knowledge (ZKPoK) for linear and multiplicative relati...
Zero-Knowledge proof is a very basic and important primitive, which allows a prover to prove some st...
Lattice-based cryptography is one of the most active research topics in cryptography in recent years...
We construct a practical lattice-based zero-knowledge argument for proving multiplicative relations ...
We propose a general technique that allows improving the complexity of zero-knowledge protocols for ...
We propose the first zero-knowledge argument with sub-linear communication complexity for arithmetic...
In applications of fully-homomorphic encryption (FHE) that involve computation on encryptions produc...
We give computationally efficient zero-knowledge proofs of knowledge for arithmetic circuit satisfia...
In this work we introduce a new hard problem in lattices called Isometric Lattice Problem (ILP) and ...