Steklov Spectral Geometry for Extrinsic Shape Analysis

• dc.contributor.author: Wang, Yu
• dc.contributor.author: Ben-Chen, Mirela
• dc.contributor.author: Polterovich, Iosif
• dc.contributor.author: Solomon, Justin
• dc.date.issued: 2019
• dc.identifier.uri: https://hdl.handle.net/1721.1/134901
• dc.description.abstract: © 2018 held by Owner/Author We propose using the Dirichlet-to-Neumann operator as an extrinsic alternative to the Laplacian for spectral geometry processing and shape analysis. Intrinsic approaches, usually based on the Laplace-Beltrami operator, cannot capture the spatial embedding of a shape up to rigid motion, and many previous extrinsic methods lack theoretical justification. Instead, we consider the Steklov eigenvalue problem, computing the spectrum of the Dirichlet-to-Neumann operator of a surface bounding a volume. A remarkable property of this operator is that it completely encodes volumetric geometry. We use the boundary element method (BEM) to discretize the operator, accelerated by hierarchical numerical schemes and preconditioning; this pipeline allows us to solve eigenvalue and linear problems on large-scale meshes despite the density of the Dirichlet-to-Neumann discretization. We further demonstrate that our operators naturally fit into existing frameworks for geometry processing, making a shift from intrinsic to extrinsic geometry as simple as substituting the Laplace-Beltrami operator with the Dirichlet-to-Neumann operator.
• dc.language.iso: en
• dc.publisher: Association for Computing Machinery (ACM)
• dc.relation.isversionof: 10.1145/3152156
• dc.source: arXiv
• dc.type: Article
• dc.contributor.department: Massachusetts Institute of Technology. Department of Electrical Engineering and Computer Science
• dc.contributor.department: Massachusetts Institute of Technology. Computer Science and Artificial Intelligence Laboratory
• dc.relation.journal: ACM Transactions on Graphics
• dc.eprint.version: Final published version
• mit.journal.volume: 38
• mit.journal.issue: 1