In this work we introduce a new hard problem in lattices called Isometric Lattice Problem (ILP) and reduce Linear Code Equivalence over prime fields and Graph Isomorphism to this prob- lem. We also show that this problem has an (efficient prover) perfect zero-knowledge interactive proof; this is the only hard problem in lattices that is known to have this property (with respect to malicious verifiers). Under the assumption that the polynomial hierarchy does not collapse, we also show that ILP cannot be NP-complete. We finally introduce a variant of ILP over the rationals radicands and provide similar results for this new problem
Lattice-based cryptography aims at harnessing the security of cryptographic primitives in the conjec...
This thesis deals with lattices, which are fundamental objects in many fields, such as number theory...
Code equivalence problem plays an important role in coding theory and code based cryptography.That i...
Abstract. In this work we introduce a new hard problem in lattices called Isometric Lattice Problem ...
This PhD thesis is about practical lattice-based zero-knowledge proof systems. We construct protocol...
Lattice-based cryptography is one of the most active research topics in cryptography in recent years...
A natural and recurring idea in the knapsack/lattice cryptography literature is to start from a latt...
The Lattice Isomorphism Problem (LIP) is the computational task of recovering, assuming it exists, a...
We propose a practical zero-knowledge proof system for proving knowledge of short solutions s, e to ...
In this thesis we will discuss hard computational problems in lattice theory and relate them to cryp...
One essential quest in cryptography is the search for hard instances of a given computational proble...
International audienceGroup encryption (GE) is the natural encryption analogue of group signatures i...
The ``learning with errors\u27\u27 (LWE) problem is to distinguish random linear equations, which ha...
Efficient lattice-based cryptography usually relies on the intractability of problems on lattices wi...
The lattice isomorphism problem (LIP) asks one to find an isometry between two lattices. It has rece...
Lattice-based cryptography aims at harnessing the security of cryptographic primitives in the conjec...
This thesis deals with lattices, which are fundamental objects in many fields, such as number theory...
Code equivalence problem plays an important role in coding theory and code based cryptography.That i...
Abstract. In this work we introduce a new hard problem in lattices called Isometric Lattice Problem ...
This PhD thesis is about practical lattice-based zero-knowledge proof systems. We construct protocol...
Lattice-based cryptography is one of the most active research topics in cryptography in recent years...
A natural and recurring idea in the knapsack/lattice cryptography literature is to start from a latt...
The Lattice Isomorphism Problem (LIP) is the computational task of recovering, assuming it exists, a...
We propose a practical zero-knowledge proof system for proving knowledge of short solutions s, e to ...
In this thesis we will discuss hard computational problems in lattice theory and relate them to cryp...
One essential quest in cryptography is the search for hard instances of a given computational proble...
International audienceGroup encryption (GE) is the natural encryption analogue of group signatures i...
The ``learning with errors\u27\u27 (LWE) problem is to distinguish random linear equations, which ha...
Efficient lattice-based cryptography usually relies on the intractability of problems on lattices wi...
The lattice isomorphism problem (LIP) asks one to find an isometry between two lattices. It has rece...
Lattice-based cryptography aims at harnessing the security of cryptographic primitives in the conjec...
This thesis deals with lattices, which are fundamental objects in many fields, such as number theory...
Code equivalence problem plays an important role in coding theory and code based cryptography.That i...