CORE Seminar: Peter Bürgisser
Topic
Speakers
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The analysis of the stability and efficiency of algorithms for convex optimization naturally leads to the study of condition numbers. The Grassmann condition, which is a geometric version of Renegar’s condition, is especially suited for a probabilistic analysis. Such analysis can be performed by relying on techniques from spherical convex geometry and differential geometry. Along this way, we obtain an average analysis of the Grassmann condition number that holds for any regular convex cone. A closer look prompts the investigation of the spherical counterparts of intrinsic volumes — a notion thoroughly studied for euclidean spaces, but much less so for spheres, so that many fascinating questions remain.
Joint work with Dennis Amelunxen.
Additional Information
Location: EEB 125
The CORE Seminar is an interdepartmental talks series focused on optimization, machine learning, big data, statistics and numerics. This new cross campus activity aims to leverage the newly established critical mass of faculty and students in these areas at UW. CORE seminar is funded in 2014–2015 by Pacific Institute of Mathematical Sciences (PIMS) and the UW Deans of Engineering and Arts and Sciences. In 2013–14, it was funded by the departments of Mathematics, Statistics, Electrical Engineering, and Computer Science Engineering, and the deans of Engineering and Arts and Sciences.
Peter Bürgisser, Institute for Mathematics