Evaluating approximations of the semidefinite cone with trace normalized distance

Abstract

We evaluate the dual cone of the set of diagonally dominant matrices (resp., scaled diagonally dominant matrices), namely DDn* (resp., SDDn*), as an approximation of the semidefinite cone. We prove that the norm normalized distance, proposed by Blekherman et al. (2022), between a set S and the semidefinite cone has the same value whenever SDDn* ⊂eq S ⊂eq DDn*. This implies that the norm normalized distance is not a sufficient measure to evaluate these approximations. As a new measure to compensate for the weakness of that distance, we propose a new distance, called the trace normalized distance. We prove that the trace normalized distance between DDn* and Sn+ has a different value from the one between SDDn* and Sn+ and give the exact values of these distances.