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arxiv: 2106.06787 · v1 · pith:YKPP3QP3new · submitted 2021-06-12 · 🧮 math.NA · cs.NA· stat.CO· stat.ME

Graph-based Prior and Forward Models for Inverse Problems on Manifolds with Boundaries

classification 🧮 math.NA cs.NAstat.COstat.ME
keywords boundarygraph-basedmodelsboundariesconditionsforwardpriorinverse
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This paper develops manifold learning techniques for the numerical solution of PDE-constrained Bayesian inverse problems on manifolds with boundaries. We introduce graphical Mat\'ern-type Gaussian field priors that enable flexible modeling near the boundaries, representing boundary values by superposition of harmonic functions with appropriate Dirichlet boundary conditions. We also investigate the graph-based approximation of forward models from PDE parameters to observed quantities. In the construction of graph-based prior and forward models, we leverage the ghost point diffusion map algorithm to approximate second-order elliptic operators with classical boundary conditions. Numerical results validate our graph-based approach and demonstrate the need to design prior covariance models that account for boundary conditions.

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