AbstractWe consider the problem of counting the number of lattice vectors of a given length. We show that problem is ♯P-complete resolving an open problem. Furthermore, we show that the problem is at least as hard as integer factorization even for lattices of bounded rank or lattices generated by vectors of bounded norm. Next, we discuss a deterministic algorithm for counting the number of lattice vectors of length d in time 2O(rs+logd), where r is the rank of the lattice, s is the number of bits that encode the basis of the lattice. The algorithm is based on the theory of modular forms
Abstract. The exact enumeration of most interesting combinatorial problems has exponential computati...
AbstractLet 0 < a, b < d be integers with a ≠ b. The lattice Ld(a, b) is the set of all multiples of...
AbstractThis paper discusses algorithms and software for the enumeration of all lattice points insid...
Abstract. We consider the problem of counting the number of lattice vectors of a given length and pr...
We consider the problem of counting the number of lattice vectors of a given length. We show that pr...
AbstractWe consider the problem of counting the number of lattice vectors of a given length. We show...
AbstractRecently I. Jensen published a novel transfer-matrix algorithm for computing the number of p...
International audienceWe present a lattice algorithm specifically designed for some classical applic...
The well known L 3 -reduction algorithm of Lov'asz transforms a given integer lattice basis b...
We address to the problem to factor a large composite number by lattice reduction algorithms. Schnor...
AbstractThe component-by-component construction algorithm constructs the generating vector for a ran...
Abstract. The Shortest lattice Vector Problem is central in lattice-based cryptography, as well as i...
International audienceThere is a well-known asymptotic formula, due to W. M. Schmidt [Duke Math. J.,...
We present a novel practical algorithm that given a lattice basis b1, ..., bn finds in O(n exp 2 *(k...
AbstractWe give a simplified proof of a theorem of Lagarias, Lenstra and Schnorr [17] that the probl...
Abstract. The exact enumeration of most interesting combinatorial problems has exponential computati...
AbstractLet 0 < a, b < d be integers with a ≠ b. The lattice Ld(a, b) is the set of all multiples of...
AbstractThis paper discusses algorithms and software for the enumeration of all lattice points insid...
Abstract. We consider the problem of counting the number of lattice vectors of a given length and pr...
We consider the problem of counting the number of lattice vectors of a given length. We show that pr...
AbstractWe consider the problem of counting the number of lattice vectors of a given length. We show...
AbstractRecently I. Jensen published a novel transfer-matrix algorithm for computing the number of p...
International audienceWe present a lattice algorithm specifically designed for some classical applic...
The well known L 3 -reduction algorithm of Lov'asz transforms a given integer lattice basis b...
We address to the problem to factor a large composite number by lattice reduction algorithms. Schnor...
AbstractThe component-by-component construction algorithm constructs the generating vector for a ran...
Abstract. The Shortest lattice Vector Problem is central in lattice-based cryptography, as well as i...
International audienceThere is a well-known asymptotic formula, due to W. M. Schmidt [Duke Math. J.,...
We present a novel practical algorithm that given a lattice basis b1, ..., bn finds in O(n exp 2 *(k...
AbstractWe give a simplified proof of a theorem of Lagarias, Lenstra and Schnorr [17] that the probl...
Abstract. The exact enumeration of most interesting combinatorial problems has exponential computati...
AbstractLet 0 < a, b < d be integers with a ≠ b. The lattice Ld(a, b) is the set of all multiples of...
AbstractThis paper discusses algorithms and software for the enumeration of all lattice points insid...