Given a polytope P n , we say that P has a positive semidefinite lift (psd lift) of size d if one can express P as the projection of an affine slice of the d×d positive semidefinite cone. Such a representation allows us to solve linear optimization problems over P using a semidefinite program of size d and can be useful in practice when d is much smaller than the number of facets of P. If a polytope P has symmetry, we can consider equivariant psd lifts, i.e., those psd lifts that respect the symmetries of P. One of the simplest families of polytopes with interesting symmetries is regular polygons in the plane. In this paper, we give tight lower and upper bounds on the size of equivariant psd lifts for regular polygons. We give an explicit c...
We consider the positive semidefinite (psd) matrices with binary entries, along with the correspondi...
In Rothvoß (Math Program 142(1–2):255–268, 2013) it was shown that there exists a 0/1 polytope (a p...
The semimetric polytope is an important polyhedral structure lying at the heart of hard combinatoria...
Given a polytope P n , we say that P has a positive semidefinite lift (psd lift) of size d if one ca...
Given a polytope P ⊂ ℝn, we say that P has a positive semidefinite lift (psd lift) of size d if one ...
Given a polytope P ⊂ Rn, we say that P has a positive semidefinite lift (psd lift) of size d if one ...
A central question in optimization is to maximize (or minimize) a linear function over a given polyt...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Electrical Engineering and Comp...
The positive semidefinite (psd) rank of a polytope is the smallest k for which the cone of k×k real ...
In combinatorial optimization, many problems can be modeled by optimizing a linear functional over ...
The positive semidefinite (psd) rank of a polytope is the size of the smallest psd cone that admits ...
Thesis (Ph.D.)--University of Washington, 2014The positive semidefinite (psd) rank of a nonnegative ...
This paper considers the problem of positive semidefinite factorization (PSD factorization), a gener...
Since the early 1960s, polyhedral methods have played a central role in both the theory and practice...
We consider the relaxation of the matching polytope defined by the non-negativity and degree constra...
We consider the positive semidefinite (psd) matrices with binary entries, along with the correspondi...
In Rothvoß (Math Program 142(1–2):255–268, 2013) it was shown that there exists a 0/1 polytope (a p...
The semimetric polytope is an important polyhedral structure lying at the heart of hard combinatoria...
Given a polytope P n , we say that P has a positive semidefinite lift (psd lift) of size d if one ca...
Given a polytope P ⊂ ℝn, we say that P has a positive semidefinite lift (psd lift) of size d if one ...
Given a polytope P ⊂ Rn, we say that P has a positive semidefinite lift (psd lift) of size d if one ...
A central question in optimization is to maximize (or minimize) a linear function over a given polyt...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Electrical Engineering and Comp...
The positive semidefinite (psd) rank of a polytope is the smallest k for which the cone of k×k real ...
In combinatorial optimization, many problems can be modeled by optimizing a linear functional over ...
The positive semidefinite (psd) rank of a polytope is the size of the smallest psd cone that admits ...
Thesis (Ph.D.)--University of Washington, 2014The positive semidefinite (psd) rank of a nonnegative ...
This paper considers the problem of positive semidefinite factorization (PSD factorization), a gener...
Since the early 1960s, polyhedral methods have played a central role in both the theory and practice...
We consider the relaxation of the matching polytope defined by the non-negativity and degree constra...
We consider the positive semidefinite (psd) matrices with binary entries, along with the correspondi...
In Rothvoß (Math Program 142(1–2):255–268, 2013) it was shown that there exists a 0/1 polytope (a p...
The semimetric polytope is an important polyhedral structure lying at the heart of hard combinatoria...