Eliot Tron, Rita Fioresi, Nicolas Couellan, Stéphane Puechmorel
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The purpose of this paper is to employ the language of Cartan moving frames
to study the geometry of the data manifolds and its Riemannian structure, via
the data information metric and its curvature at data points. Using this
framework and through experiments, explanations on the response of a neural
network are given by pointing out the output classes that are easily reachable
from a given input. This emphasizes how the proposed mathematical relationship
between the output of the network and the geometry of its inputs can be
exploited as an explainable artificial intelligence tool.
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