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Caltech

Computing and Mathematical Sciences Colloquium

Monday, February 13, 2017
4:00pm to 5:00pm
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Annenberg 105
Variational Problems on Graphs and Their Continuum Limits
Associate Professor Dejan Slepčev, Department of Mathematical Sciences, Carnegie Mellon University,

I will discuss variational problems arising in machine learning and their limits as the number of data points goes to infinity. Consider point clouds obtained as random samples of an underlying "ground-truth" measure. Graph representing the point cloud is obtained by assigning weights to edges based on the distance between the points. Many machine learning tasks, such as clustering and classification, can be posed as minimizing functionals on such graphs. We consider functionals involving graph cuts and graph laplacians and their limits as the number of data points goes to infinity. In particular we establish for what graph constructions the minimizers of discrete problems converge to a minimizer of a functional defined in the continuum setting. The talk is primarily based on joint work with Nicolas Garcia Trillos, as well as on works with Xavier Bresson, Moritz Gerlach, Matthias Hein, Thomas Laurent, James von Brecht and Matt Thorpe.

For more information, please contact Carmen Nemer-Sirois by phone at (626) 395-4561 or by email at [email protected].