This thesis deals with lattices, which are fundamental objects in many fields, such as number theory and cryptography.As a first step, we propose a generalization and an implantation of the Lenstra, Lenstra and Lov'asz algorithm (LLL algorithm) in the simple algebraic setting of lattices over quadratic imaginary and euclidean ring of integers.Then, we present the notions of algebraic lattices and Humbert forms, which are extensions of euclidean lattices and quadratic forms in a large algebraic setting. Introducing these objects leads us to develop and implant modifications of the Plesken and Souvignier algorithm. This algorithm efficiently solves the isometric lattices problem and the automorphism group computation problem for algebraic lat...
In this work we introduce a new hard problem in lattices called Isometric Lattice Problem (ILP) and ...
The celebrated LLL algorithm for Euclidean lattices is central to cryptanalysis of well- known and d...
We develop a framework for solving polynomial equations with size constraints on solutions. We obtai...
This thesis deals with lattices, which are fundamental objects in many fields, such as number theory...
Les travaux présentés dans ce mémoire concernent les réseaux, qui sont des objets mathématiques fond...
Euclidean lattices are a rich algebraic object that occurs in a wide variety of contexts in mathemat...
Euclidean lattices are a powerful tool for several algorithmic topics, among which are cryptography ...
AbstractWe present the main ideas for an algorithm to calculate the group of automorphisms of a Eucl...
Euclidean lattices are a particularly powerful tool for severalalgorithmic topics, among which are c...
A natural and recurring idea in the knapsack/lattice cryptography literature is to start from a latt...
Bases in the complex field, along with direct-sums defined by rings of imaginary quadratic integers,...
Les réseaux sont des objets mathématiques qui généralisent l'idée concrète de grille dans le plan. I...
This book includes a self-contained approach of the general theory of quadratic forms and integral E...
Lattice-based cryptography is a branch of cryptography exploiting the presumed hardness of some well...
In this thesis we will discuss hard computational problems in lattice theory and relate them to cryp...
In this work we introduce a new hard problem in lattices called Isometric Lattice Problem (ILP) and ...
The celebrated LLL algorithm for Euclidean lattices is central to cryptanalysis of well- known and d...
We develop a framework for solving polynomial equations with size constraints on solutions. We obtai...
This thesis deals with lattices, which are fundamental objects in many fields, such as number theory...
Les travaux présentés dans ce mémoire concernent les réseaux, qui sont des objets mathématiques fond...
Euclidean lattices are a rich algebraic object that occurs in a wide variety of contexts in mathemat...
Euclidean lattices are a powerful tool for several algorithmic topics, among which are cryptography ...
AbstractWe present the main ideas for an algorithm to calculate the group of automorphisms of a Eucl...
Euclidean lattices are a particularly powerful tool for severalalgorithmic topics, among which are c...
A natural and recurring idea in the knapsack/lattice cryptography literature is to start from a latt...
Bases in the complex field, along with direct-sums defined by rings of imaginary quadratic integers,...
Les réseaux sont des objets mathématiques qui généralisent l'idée concrète de grille dans le plan. I...
This book includes a self-contained approach of the general theory of quadratic forms and integral E...
Lattice-based cryptography is a branch of cryptography exploiting the presumed hardness of some well...
In this thesis we will discuss hard computational problems in lattice theory and relate them to cryp...
In this work we introduce a new hard problem in lattices called Isometric Lattice Problem (ILP) and ...
The celebrated LLL algorithm for Euclidean lattices is central to cryptanalysis of well- known and d...
We develop a framework for solving polynomial equations with size constraints on solutions. We obtai...