Concretely efficient interactive oracle proofs (IOPs) are of interest due to their applications to scaling blockchains, their minimal security assumptions, and their potential future-proof resistance to quantum attacks. Scalable IOPs, in which prover time scales quasilinearly with the computation size and verifier time scales poly-logarithmically with it, have been known to exist thus far only over a set of finite fields of negligible density, namely, over FFT-friendly fields that contain a sub-group of size $2^k$. Our main result is to show that scalable IOPs can be constructed over any sufficiently large finite field, of size that is at least quadratic in the length of computation whose integrity is proved by the IOP. This result has...
We provide new hash functions into (hyper)elliptic curves over finite fields. These functions aim at...
This article proposes four optimizations of indifferentiable hashing onto (prime-order subgroups of)...
This paper considers efficient scalar multiplication of elliptic curves over binary fields with a tw...
Interactive Oracle Proof of Proximity (IOPPs) are a powerful tool for constructing succinct non-inte...
We study interactive oracle proofs (IOPs) [BCS16,RRR16], which combine aspects of probabilistically ...
Interactive oracle proofs (IOPs) are a generalization of probabilistically checkable proofs that can...
Many elliptic curve cryptosystems require an encoding function from a finite field Fq into Fq-rational...
We introduce an efficient SNARK for towers of binary fields. Adapting Brakedown (CRYPTO \u2723), we ...
In this work, we study the question of what set of simple-to-state assumptions suffice for construct...
Many cryptosystems are based on the difficulty of the discrete logarithm problem in finitegroups. In...
GLS254 is an elliptic curve defined over a finite field of characteristic 2; it contains a 253-bit p...
This thesis introduces a new tower field representation, optimal tower fields (OTFs), that facilitat...
The groundbreaking idea of public key cryptography and the rapid expansion of the internetin the 80s...
The present article provides a novel hash function $\mathcal{H}$ to any elliptic curve of $j$-invari...
International audienceWe present a specialized point-counting algorithm for a class of elliptic curv...
We provide new hash functions into (hyper)elliptic curves over finite fields. These functions aim at...
This article proposes four optimizations of indifferentiable hashing onto (prime-order subgroups of)...
This paper considers efficient scalar multiplication of elliptic curves over binary fields with a tw...
Interactive Oracle Proof of Proximity (IOPPs) are a powerful tool for constructing succinct non-inte...
We study interactive oracle proofs (IOPs) [BCS16,RRR16], which combine aspects of probabilistically ...
Interactive oracle proofs (IOPs) are a generalization of probabilistically checkable proofs that can...
Many elliptic curve cryptosystems require an encoding function from a finite field Fq into Fq-rational...
We introduce an efficient SNARK for towers of binary fields. Adapting Brakedown (CRYPTO \u2723), we ...
In this work, we study the question of what set of simple-to-state assumptions suffice for construct...
Many cryptosystems are based on the difficulty of the discrete logarithm problem in finitegroups. In...
GLS254 is an elliptic curve defined over a finite field of characteristic 2; it contains a 253-bit p...
This thesis introduces a new tower field representation, optimal tower fields (OTFs), that facilitat...
The groundbreaking idea of public key cryptography and the rapid expansion of the internetin the 80s...
The present article provides a novel hash function $\mathcal{H}$ to any elliptic curve of $j$-invari...
International audienceWe present a specialized point-counting algorithm for a class of elliptic curv...
We provide new hash functions into (hyper)elliptic curves over finite fields. These functions aim at...
This article proposes four optimizations of indifferentiable hashing onto (prime-order subgroups of)...
This paper considers efficient scalar multiplication of elliptic curves over binary fields with a tw...