scientific article
From MaRDI portal
Publication:3092534
zbMath1237.68007MaRDI QIDQ3092534
Publication date: 19 September 2011
Full work available at URL: http://www.crcnetbase.com/isbn/9781439807040
Title: zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Symbolic computation and algebraic computation (68W30) Number-theoretic algorithms; complexity (11Y16) Lattices and convex bodies (number-theoretic aspects) (11H06) Research exposition (monographs, survey articles) pertaining to computer science (68-02) Polynomials, factorization in commutative rings (13P05)
Related Items (19)
The Liouville Function and the Riemann Hypothesis ⋮ An efficient lattice reduction using reuse technique blockwisely on NTRU ⋮ Special identities for the pre-Jordan product in the free dendriform algebra ⋮ Fundamental invariants for the action of $SL_3(\mathbb {C}) \times SL_3(\mathbb {C}) \times SL_3(\mathbb {C})$ on $3 \times 3 \times 3$ arrays ⋮ Duplication free public keys based on SIS-type problems ⋮ Jordan quadruple systems ⋮ New orthogonality criterion for shortest vector of lattices and its applications ⋮ An Efficient Algorithm for Integer Lattice Reduction ⋮ One-parameter deformations of the diassociative and dendriform operads ⋮ Structure of the rational monoid algebra for Boolean matrices of order 3 ⋮ Comment on: ``Sum of squares of uniform random variables by I. Weissman ⋮ Volumes for \(\text{SL}_N(\mathbb{R})\), the Selberg integral and random lattices ⋮ A Lattice Attack on Homomorphic NTRU with Non-invertible Public Keys ⋮ Storage efficient algorithm for Hermite normal form using LLL ⋮ Analysis of decreasing squared-sum of Gram-Schmidt lengths for short lattice vectors ⋮ Volumes and distributions for random unimodular complex and quaternion lattices ⋮ Lattice preconditioning for the real relaxation branch-and-bound approach for integer least squares problems ⋮ An experimental comparison of some LLL-type lattice basis reduction algorithms ⋮ Linear relations of zeroes of the zeta-function
Uses Software
This page was built for publication:
