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CNNs on surfaces using rotation-equivariant features

Ruben Wiersma, Elmar Eisemann, Klaus Hildebrandt

2020ACM Transactions on Graphics57 citationsDOIOpen Access PDF

Abstract

This paper is concerned with a fundamental problem in geometric deep learning that arises in the construction of convolutional neural networks on surfaces. Due to curvature, the transport of filter kernels on surfaces results in a rotational ambiguity, which prevents a uniform alignment of these kernels on the surface. We propose a network architecture for surfaces that consists of vector-valued, rotation-equivariant features. The equivariance property makes it possible to locally align features, which were computed in arbitrary coordinate systems, when aggregating features in a convolution layer. The resulting network is agnostic to the choices of coordinate systems for the tangent spaces on the surface. We implement our approach for triangle meshes. Based on circular harmonic functions, we introduce convolution filters for meshes that are rotation-equivariant at the discrete level. We evaluate the resulting networks on shape correspondence and shape classifications tasks and compare their performance to other approaches.

Topics & Concepts

Convolution (computer science)TangentComputer sciencePolygon meshConvolutional neural networkFilter (signal processing)Artificial intelligenceProperty (philosophy)Surface (topology)HarmonicAlgorithmTopology (electrical circuits)MathematicsComputer visionTangent spaceCoordinate systemParametric surfaceKernel (algebra)Geometry processingGeometryArtificial neural networkCircular convolutionCoordinate spaceGeometric primitiveSpace (punctuation)Position (finance)Deep learningTangent vector3D Shape Modeling and AnalysisAdvanced Graph Neural NetworksMorphological variations and asymmetry
CNNs on surfaces using rotation-equivariant features | Litcius