Daniele Di Tullio scite author profile

2023

Iran J Comput Sci

In this paper we present a new signature scheme based on the difficulty of finding a point in a shifted Grassmannian variety or on its secant variety from a knowledge of its defining polynomials. An advantage of using the secant variety of the Grassmannian is that it is defined by sparse cubic equations, which are in general more difficult to solve than quadratic ones, thereby reducing the size of the public key.

A post-quantum key exchange protocol from the intersection of quadric surfaces

2023

J Supercomput

A post-quantum key exchange protocol from the intersection of quadric surfaces

Tullio¹,

Gyawali²

2020

Preprint

In this paper we present a key exchange protocol in which Alice and Bob have secret keys given by quadric surfaces embedded in a large ambient space by means of the Veronese embedding and public keys given by hyperplanes containing the embedded quadrics. Both of them reconstruct the isomorphism class of the intersection which is a curve of genus 1, which is uniquely determined by the j-invariant. An eavesdropper, to find this j-invariant, has to solve problems which are conjecturally quantum resistant.

A post-quantum signature scheme from the secant variety of the Grassmannian

2022

Preprint

A post-quantum key exchange protocol from the intersection of quadric surfaces

2022

Preprint

In this paper, we present a new key exchange protocol in which Alice and Bob have secret keys given by quadric surfaces embedded in a large ambient space by means of the Veronese embedding and public keys given by hyperplanes containing the embedded quadrics. Both of them reconstruct the isomorphism class of the intersection which is a curve of genus 1, and is uniquely determined by the j-invariant. An eavesdropper, to find this j-invariant, has to solve problems which are conjecturally quantum resistant.