This paper proposes new Polynomial IOPs for arithmetic circuits. They rely on the monomial coefficient basis to represent the matrices and vectors arising from the arithmetic constraint satisfaction system, and build on new protocols for establishing the correct computation of linear algebra relations such as matrix-vector products and Hadamard products. Our protocols give rise to concrete proof systems with succinct verification when compiled down with a cryptographic compiler whose role is abstracted away in this paper. Depending only on the compiler, the resulting SNARKs are either transparent or rely on a trusted setup
Previously [4], Orbis Labs presented a method for compiling (“arithmetizing”) relations, expressed a...
Authentication over insecure public networks or with untrusted servers raises more concerns in priva...
Among secure multi-party computation protocols, linear secret sharing schemes often do not rely on c...
This PhD thesis is about practical lattice-based zero-knowledge proof systems. We construct protocol...
International audienceOblivious Polynomial Evaluation (OPE) schemes are interactive protocols betwee...
Exact linear algebra is an essential tool for scientific computation, which is used ina wide array o...
International audienceWe describe a step-by-step approach to the implementation and formal verificat...
Certificates to a linear algebra computation are additional data struc-tures for each output, which ...
This article extracts the elements of algebra that play a central role in the design of efficient pr...
Algebraic solving of polynomial systems and satisfiability of propositional logic formulas are not t...
Interactive Oracle Proof of Proximity (IOPPs) are a powerful tool for constructing succinct non-inte...
Linear algebra operations on private distributed data are frequently required in several practical s...
Motivated by the growth in outsourced data analysis, we describe methods for verifying basic linear ...
Motivated by the growth in outsourced data analysis, we describe methods for verifying basic linear ...
International audienceWe design and analyze new protocols to verify the correctness of various compu...
Previously [4], Orbis Labs presented a method for compiling (“arithmetizing”) relations, expressed a...
Authentication over insecure public networks or with untrusted servers raises more concerns in priva...
Among secure multi-party computation protocols, linear secret sharing schemes often do not rely on c...
This PhD thesis is about practical lattice-based zero-knowledge proof systems. We construct protocol...
International audienceOblivious Polynomial Evaluation (OPE) schemes are interactive protocols betwee...
Exact linear algebra is an essential tool for scientific computation, which is used ina wide array o...
International audienceWe describe a step-by-step approach to the implementation and formal verificat...
Certificates to a linear algebra computation are additional data struc-tures for each output, which ...
This article extracts the elements of algebra that play a central role in the design of efficient pr...
Algebraic solving of polynomial systems and satisfiability of propositional logic formulas are not t...
Interactive Oracle Proof of Proximity (IOPPs) are a powerful tool for constructing succinct non-inte...
Linear algebra operations on private distributed data are frequently required in several practical s...
Motivated by the growth in outsourced data analysis, we describe methods for verifying basic linear ...
Motivated by the growth in outsourced data analysis, we describe methods for verifying basic linear ...
International audienceWe design and analyze new protocols to verify the correctness of various compu...
Previously [4], Orbis Labs presented a method for compiling (“arithmetizing”) relations, expressed a...
Authentication over insecure public networks or with untrusted servers raises more concerns in priva...
Among secure multi-party computation protocols, linear secret sharing schemes often do not rely on c...