v2007.09.13 - Convex Optimization

Chapter 7Proximity problemsIn summary, we find that the solution to problem [(1112.3) p.443]is difficult and depends on the dimension of the space as thegeometry of the cone of EDMs becomes more complex.−Hayden, Wells, Liu, & Tarazaga (1991) [133,3]A problem common to various sciences is to find the Euclidean distancematrix (EDM) D ∈ EDM N closest in some sense to a given complete matrixof measurements H under a constraint on affine dimension 0 ≤ r ≤ N −1(2.3.1,5.7.1.1); rather, r is bounded above by desired affine dimension ρ .2001 Jon Dattorro. CO&EDG version 2007.09.13. All rights reserved.Citation: Jon Dattorro, Convex Optimization & Euclidean Distance Geometry,Meboo Publishing USA, 2005.437