Jens Agerberg: Certifying Robustness via Topological Representations
Time: Tue 2024-10-29 10.15
Location: KTH 3418, Lindstedtsvägen 25 and Zoom
Video link: Meeting ID: 632 2469 3290
Participating: Jens Agerberg (KTH)
Abstract
In machine learning, the ability to obtain representations that capture underlying geometrical and topological structures of data spaces is crucial. A common approach in Topological Data Analysis to extract multi-scale intrinsic geometric properties of data is persistent homology. This methods enjoys theoretical stability results (i.e Lipschitz continuity with respect to appropriate metrics), however the significance of this robustness when persistent homology is used in machine learning is under-explored. We propose a neural network architecture that can learn discriminative geometric representations from persistence with a controllable Lipschitz constant. In adversarial learning, this end-to-end stability can be used to certify epsilon-robustness for samples in a dataset, which we demonstrate on a data set representing the orbits of a discrete dynamical system.