URL lists article on conference siteIn this paper, we consider the problem of approximately solving a system of homogeneous linear equations over reals, where each equation contains at most three variables. Since the all-zero assignment always satisfies all the equations exactly, we restrict the assignments to be “non-trivial”. Here is an informal statement of our result: it is NP-hard to distinguish whether there is a non-trivial assignment that satisfies $1-\delta$ fraction of the equations or every non-trivial assignment fails to satisfy a constant fraction of the equations with a ``margin" of $\Omega(\sqrt{\delta})$. We develop linearity and dictatorship testing procedures for functions f : Rn 7--> R over a Gaussian space, whic...
AbstractWe consider optimization of nonlinear objective functions that balance d linear criteria ove...
It is known that in general, solving interval linear systems is NP-hard. There exist several proofs ...
AbstractWe investigate overdetermined systems of m linear equations in d unknowns. We equip Rm with ...
Checking whether a system of linear equations is consistent is a basic computational problem with ub...
AbstractIt is shown that the problem of computing the optimal solutions of several versions of impre...
Given a linear equation L, a set A of integers is L-free if A does not contain any non-trivial solut...
This work investigates the hardness of computing sparse solutions to systems of linear equations ove...
Max-Satisfy is the problem of ¯nding an assignment that satis¯es the maximum number of equations in ...
We investigate the class of regular-ordered word equations. In such equations, each variable occurs ...
An instance of the 2-Lin(2) problem is a system of equations of the form "x_i + x_j = b (mod 2)". Gi...
AbstractIt is shown that the tractable class of CNF formulas solvable by linear autarkies properly c...
13 pages.International audienceThe multivariate resultant is a fundamental tool of computational alg...
The journal version of this article can be found at: www.elsevier.com/locate/yjcssLet F(ρn,∆n) denot...
Given a linear equationL, a setAof integers isL-free ifAdoes not contain anynon-trivial solutions to...
Consider the following two-player communication process to decide a language $L$: The first player h...
AbstractWe consider optimization of nonlinear objective functions that balance d linear criteria ove...
It is known that in general, solving interval linear systems is NP-hard. There exist several proofs ...
AbstractWe investigate overdetermined systems of m linear equations in d unknowns. We equip Rm with ...
Checking whether a system of linear equations is consistent is a basic computational problem with ub...
AbstractIt is shown that the problem of computing the optimal solutions of several versions of impre...
Given a linear equation L, a set A of integers is L-free if A does not contain any non-trivial solut...
This work investigates the hardness of computing sparse solutions to systems of linear equations ove...
Max-Satisfy is the problem of ¯nding an assignment that satis¯es the maximum number of equations in ...
We investigate the class of regular-ordered word equations. In such equations, each variable occurs ...
An instance of the 2-Lin(2) problem is a system of equations of the form "x_i + x_j = b (mod 2)". Gi...
AbstractIt is shown that the tractable class of CNF formulas solvable by linear autarkies properly c...
13 pages.International audienceThe multivariate resultant is a fundamental tool of computational alg...
The journal version of this article can be found at: www.elsevier.com/locate/yjcssLet F(ρn,∆n) denot...
Given a linear equationL, a setAof integers isL-free ifAdoes not contain anynon-trivial solutions to...
Consider the following two-player communication process to decide a language $L$: The first player h...
AbstractWe consider optimization of nonlinear objective functions that balance d linear criteria ove...
It is known that in general, solving interval linear systems is NP-hard. There exist several proofs ...
AbstractWe investigate overdetermined systems of m linear equations in d unknowns. We equip Rm with ...