A Positive Semidefinite Approximation of the Symmetric Traveling Salesman Polytope
Abstract
For a convex body B in a vector space V, we construct its approximation Pk, k=1, 2, . . . using an intersection of a cone of positive semidefinite quadratic forms with an affine subspace. We show that Pk is contained in B for each k. When B is the Symmetric Traveling Salesman Polytope on n cities Tn, we show that the scaling of Pk by n/k+ O(1/n) contains Tn for k no more than n/2. Membership for Pk is computable in time polynomial in n (of degree linear in k). We discuss facets of Tn that lie on the boundary of Pk. We introduce a new measure on each facet defining inequality for Tn in terms of the eigenvalues of a quadratic form. Using these eigenvalues of facets, we show that the scaling of P1 by n(1/2) has all of the facets of Tn defined by the subtour elimination constraints either in its interior or lying on its boundary.
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