Parametrizing Product Shape Manifolds by Composite Networks
- URL: http://arxiv.org/abs/2302.14665v1
- Date: Tue, 28 Feb 2023 15:31:23 GMT
- Title: Parametrizing Product Shape Manifolds by Composite Networks
- Authors: Josua Sassen, Klaus Hildebrandt, Martin Rumpf, Benedikt Wirth
- Abstract summary: We show that it is possible to learn an efficient neural network approximation for shape spaces with a special product structure.
Our proposed architecture leverages this structure by separately learning approximations for the low-dimensional factors and a subsequent combination.
- Score: 5.772786223242281
- License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
- Abstract: Parametrizations of data manifolds in shape spaces can be computed using the
rich toolbox of Riemannian geometry. This, however, often comes with high
computational costs, which raises the question if one can learn an efficient
neural network approximation. We show that this is indeed possible for shape
spaces with a special product structure, namely those smoothly approximable by
a direct sum of low-dimensional manifolds. Our proposed architecture leverages
this structure by separately learning approximations for the low-dimensional
factors and a subsequent combination. After developing the approach as a
general framework, we apply it to a shape space of triangular surfaces. Here,
typical examples of data manifolds are given through datasets of articulated
models and can be factorized, for example, by a Sparse Principal Geodesic
Analysis (SPGA). We demonstrate the effectiveness of our proposed approach with
experiments on synthetic data as well as manifolds extracted from data via
SPGA.
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