We study the rank of the Sum of Squares (SoS) hierarchy over the Boolean hypercube for Symmetric Quadratic Functions (SQFs) in n variables with roots placed in points k - 1 and k. Functions of this type have played a central role in deepening the understanding of the performance of the SoS method for various unconstrained Boolean hypercube optimization problems, including the Max Cut problem. Recently, Lee, Prakash, de Wolf, and Yuen proved a lower bound on the SoS rank for SQFs of Ω(√k(n - k)) and conjectured the lower bound of Ω(n) by similarity to a polynomial representation of the n-bit OR function. Leveraging recent developments on Chebyshev polynomials, we refute the Lee-Prakash-de Wolf- Yuen conjecture and prove that the SoS rank for...
We exhibit families of 4-CNF formulas over n variables that have sums-of-squares (SOS) proofs of uns...
We show that if a system of degree-k polynomial constraints on n Boolean variables has a Sums-of-Squ...
It is well-known that any sum of squares (SOS) program can be cast as a semidefinite program (SDP) o...
We study the rank of the Sum of Squares (SoS) hierarchy over the Boolean hypercube for Symmetric Qua...
We introduce a method for proving bounds on the SoS rank based on Boolean Function Analysis and Appr...
Various key problems from theoretical computer science can be expressed as polynomial optimization p...
We study how well functions over the boolean hypercube of the form f_k(x)=(lxl-k)(lxl-k-1) can be ap...
Various key problems from theoretical computer science can be expressed as polynomial optimization p...
We give two results concerning the power of the Sum-Of-Squares(SoS)/Lasserre hierarchy. For binary p...
We consider the sum-of-squares hierarchy of approximations for the problem of minimizing a polynomia...
We study how well functions over the boolean hypercube of the form f_k(x)=(|x|-k)(|x|-k-1) can be ap...
Semidenite programming (SDP) relaxations have been a popular choice for approximationalgorithm desig...
Let X be a finite set of points in R^n. A polynomial p nonnegative on X can be written as a sum of s...
Various key problems from theoretical computer science can be expressed as polynomial optimization p...
We exhibit families of 4-CNF formulas over n variables that have sums-of-squares (SOS) proofs of uns...
We show that if a system of degree-k polynomial constraints on n Boolean variables has a Sums-of-Squ...
It is well-known that any sum of squares (SOS) program can be cast as a semidefinite program (SDP) o...
We study the rank of the Sum of Squares (SoS) hierarchy over the Boolean hypercube for Symmetric Qua...
We introduce a method for proving bounds on the SoS rank based on Boolean Function Analysis and Appr...
Various key problems from theoretical computer science can be expressed as polynomial optimization p...
We study how well functions over the boolean hypercube of the form f_k(x)=(lxl-k)(lxl-k-1) can be ap...
Various key problems from theoretical computer science can be expressed as polynomial optimization p...
We give two results concerning the power of the Sum-Of-Squares(SoS)/Lasserre hierarchy. For binary p...
We consider the sum-of-squares hierarchy of approximations for the problem of minimizing a polynomia...
We study how well functions over the boolean hypercube of the form f_k(x)=(|x|-k)(|x|-k-1) can be ap...
Semidenite programming (SDP) relaxations have been a popular choice for approximationalgorithm desig...
Let X be a finite set of points in R^n. A polynomial p nonnegative on X can be written as a sum of s...
Various key problems from theoretical computer science can be expressed as polynomial optimization p...
We exhibit families of 4-CNF formulas over n variables that have sums-of-squares (SOS) proofs of uns...
We show that if a system of degree-k polynomial constraints on n Boolean variables has a Sums-of-Squ...
It is well-known that any sum of squares (SOS) program can be cast as a semidefinite program (SDP) o...