Add to ORKGCyclic lattices are sublattices of ZN that are preserved under the rotational shift operator. Cyclic lattices were introduced by D.~Micciancio and their properties were studied in the recent years by several authors due to their importance in cryptography. In particular, Peikert and Rosen showed that on cyclic lattices in prime dimensions, the shortest independent vectors problem SIVP reduces to the shortest vector problem SVP with a particularly small loss in approximation factor, as compared to general lattices. In this paper, we further investigate geometric properties of cyclic lattices. Our main result is a counting estimate for the number of well-rounded cyclic lattices, indicating that well-rounded lattices are more common among cycl...
The Ring-LWE over two-to-power cyclotomic integer rings has been the hard computational problem for ...
We present a natural reverse Minkowski-type inequality for lattices, which gives upper bounds on the...
The efforts of this research project are best understood in the context of the subfield of dynamical...
Cyclic lattices are sublattices of ZN that are preserved under the rotational shift operator. Cyclic...
Abstract. Cyclic lattices are sublattices of ZN that are preserved under the rotational shift operat...
This paper is devoted to the study of lattices generated by finite Abelian groups. Special species o...
We say that a Euclidean lattice in Rn is permutation invariant if its automorphism group has non-tri...
Cyclic sieving phenomenon (CSP) is a generalization by Reiner, Stanton, White of Stembridge's q=-1 p...
In this thesis, we review basic properties of linear codes and lattices with a certain focus on thei...
We say that a Euclidean lattice in Rn is permutation invariant if its automorphism group has non-tri...
In this work, we present a explicit trace forms for maximal real subfields of cyclotomic fields as t...
The Lattice Isomorphism Problem (LIP) is the computational task of recovering, assuming it exists, a...
In their well known book Tsfasman and Vladut introduced a construction of a family of function field...
AbstractTextA lattice is called well-rounded if its minimal vectors span the corresponding Euclidean...
We investigate the properties of the zeta-function of well-rounded sublattices of a fixed arithmetic...
The Ring-LWE over two-to-power cyclotomic integer rings has been the hard computational problem for ...
We present a natural reverse Minkowski-type inequality for lattices, which gives upper bounds on the...
The efforts of this research project are best understood in the context of the subfield of dynamical...
Cyclic lattices are sublattices of ZN that are preserved under the rotational shift operator. Cyclic...
Abstract. Cyclic lattices are sublattices of ZN that are preserved under the rotational shift operat...
This paper is devoted to the study of lattices generated by finite Abelian groups. Special species o...
We say that a Euclidean lattice in Rn is permutation invariant if its automorphism group has non-tri...
Cyclic sieving phenomenon (CSP) is a generalization by Reiner, Stanton, White of Stembridge's q=-1 p...
In this thesis, we review basic properties of linear codes and lattices with a certain focus on thei...
We say that a Euclidean lattice in Rn is permutation invariant if its automorphism group has non-tri...
In this work, we present a explicit trace forms for maximal real subfields of cyclotomic fields as t...
The Lattice Isomorphism Problem (LIP) is the computational task of recovering, assuming it exists, a...
In their well known book Tsfasman and Vladut introduced a construction of a family of function field...
AbstractTextA lattice is called well-rounded if its minimal vectors span the corresponding Euclidean...
We investigate the properties of the zeta-function of well-rounded sublattices of a fixed arithmetic...
The Ring-LWE over two-to-power cyclotomic integer rings has been the hard computational problem for ...
We present a natural reverse Minkowski-type inequality for lattices, which gives upper bounds on the...
The efforts of this research project are best understood in the context of the subfield of dynamical...