Add to ORKGWe consider the fundamental problem of solving quadratic systems of equations in n variables, where yi = |〈ai,x〉|2, i = 1,...,m and x ∈ Rn is unknown. We propose a novel method, which starting with an initial guess computed by means of a spectral method, proceeds by minimizing a nonconvex functional as in the Wirtinger flow approach [11]. There are several key distinguishing features, most notably, a distinct objective functional and novel update rules, which operate in an adaptive fashion and drop terms bearing too much influence on the search direction. These careful selection rules provide a tighter initial guess, better descent directions, and thus enhanced practical performance. On the theoretical side, we prove that for certain unstru...
Random CSPs are known to be unsatisfiable with high probability when the number of clauses is at lea...
A fundamental problem in computer science is to find all the common zeroes of m quadratic poly-nomia...
Analysis of condition number for random matrices originated in the works of von Neumann and Turing o...
International audienceThe security of multivariate cryptosystems and digital signature schemes relie...
Abstract. It is well known that the problem to solve a set of randomly chosen multivariate quadratic...
We provide a sufficient condition for solvability of a system of real quadratic equations pi(x) = yi...
A simple randomized algorithm is given for finding an integer solution to a system of linear Diophan...
[EN] This paper is aimed to extend, the non-autonomous case, the results recently given in the paper...
We study multivariate systems of quadratic equations of the form F (x) = s where F : R^n → R^n and ...
The standard quadratic optimization problem (StQP) refers to the problem of minimizing a quadratic f...
We consider the problem of finding solutions to systems of polynomial equations over a finite field....
Let p be a prime and k, t be positive integers. Given a quadratic equation Q(x1,x2,...,xn)=t mod p^k...
International audienceA fundamental problem in computer science is to find all the common zeroes of ...
AbstractOur randomized preprocessing enables pivoting-free and orthogonalization-free solution of ho...
We develop a novel, fundamental and surprisingly simple randomized iterative method for solving cons...
Random CSPs are known to be unsatisfiable with high probability when the number of clauses is at lea...
A fundamental problem in computer science is to find all the common zeroes of m quadratic poly-nomia...
Analysis of condition number for random matrices originated in the works of von Neumann and Turing o...
International audienceThe security of multivariate cryptosystems and digital signature schemes relie...
Abstract. It is well known that the problem to solve a set of randomly chosen multivariate quadratic...
We provide a sufficient condition for solvability of a system of real quadratic equations pi(x) = yi...
A simple randomized algorithm is given for finding an integer solution to a system of linear Diophan...
[EN] This paper is aimed to extend, the non-autonomous case, the results recently given in the paper...
We study multivariate systems of quadratic equations of the form F (x) = s where F : R^n → R^n and ...
The standard quadratic optimization problem (StQP) refers to the problem of minimizing a quadratic f...
We consider the problem of finding solutions to systems of polynomial equations over a finite field....
Let p be a prime and k, t be positive integers. Given a quadratic equation Q(x1,x2,...,xn)=t mod p^k...
International audienceA fundamental problem in computer science is to find all the common zeroes of ...
AbstractOur randomized preprocessing enables pivoting-free and orthogonalization-free solution of ho...
We develop a novel, fundamental and surprisingly simple randomized iterative method for solving cons...
Random CSPs are known to be unsatisfiable with high probability when the number of clauses is at lea...
A fundamental problem in computer science is to find all the common zeroes of m quadratic poly-nomia...
Analysis of condition number for random matrices originated in the works of von Neumann and Turing o...