Convexity of a small ball under quadratic map (original) (raw)
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SIAM Journal on Optimization, 2006
We describe a Jordan-algebraic version of results related to convexity of images of quadratic mappings as well as related results on exactness of symmetric relaxations of certain classes of nonconvex optimization problems. The exactness of relaxations is proved based on rank estimates. Our approach provides a unifying viewpoint on a large number of classical results related to cones of Hermitian matrices over real and complex numbers. We describe (apparently new) results related to cones of Hermitian matrices with quaternion entries and to the exceptional 27-dimensional Euclidean Jordan algebra.
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Linear Algebra and its Applications, 2004
The purpose of this paper is to show that the joint numerical range of a m-tuple of n×n hermitian matrices is convex whenever the largest eigenvalue of an associated family of hermitian matrices parameterized by the (m − 1)-dimensional sphere has constant multiplicity and, as a more technical condition, the union over the sphere of the largest eigenvalue eigenspaces does not fill the full n-dimensional complex * Partially supported by the National Science Foundation grant ECS-98-02594. vector space. It is this global, as opposed to local, behavior of the eigenvalues that makes the problem essentially topological. For m ≤ 3, it is shown that the set of hermitian matrices with simple eigenvalues is open and dense in the space of all hermitian matrices, from which it already follows that the numerical range is generically convex for m ≤ 3. From there on, an additional argument shows that convexity always holds when m ≤ 3 and n ≥ 3. Furthermore, our sufficient condition for convexity is in fact a criterion for stable convexity, in the sense that should the sufficient condition fails while convexity holds, the latter can be destroyed by an arbitrarily small perturbation of the data.
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Let n P 1 and f : R n ! R a convex function. Given distinct points z 1 ; z 2 ; . . . ; z N in R n we consider the problem of finding a quadratic function g : R n ! R such that k½f ðz 1 Þ À gðz 1 Þ; . . . ; f ðz N Þ À gðz N Þk is minimal for a given norm k Á k. For the Euclidean norm this is the wellknown quadratic least squares problem. (If the norm is not specified we will simply refer to g as the quadratic approximation.) In this paper we prove the result that the quadratic approximation is not necessarily convex for n ! 2, even though it is convex if n ¼ 1. This result has many consequences both for the field of statistics and optimization. We show that the best convex quadratic approximation can be obtained in the multivariate case by using semidefinite programming techniques.
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