On the Geometry and Quantization of Manifolds of Positive Semi-Definite Matrices

Abstract: The geometry of different spaces of positive semi-definite matrices buffeted by rank and trace constraints is studied. In addition to revealing their Riemannian structure, we derive the normalized volume of a ball over these spaces. Further, we use the leading coefficient from the ball volume expansion to bound the quantization error incurred with finite-sized sphere-packing codebooks as well as random codebooks to represent sources distributed over general Riemannian manifolds.

Implementation of a Gaussian process-based machine learning grasp predictor

Implementation of a Gaussian process-based machine learning grasp predictor

Continuous Path Smoothing for Car-Like Robots Using B-Spline Curves

A Test Environment for Wireless Hacking in Domestic IoT Scenarios