Litcius/Paper detail

Screened poisson surface reconstruction

Michael Kazhdan, Hugues Hoppe

2013ACM Transactions on Graphics2,218 citationsDOI

Abstract

Poisson surface reconstruction creates watertight surfaces from oriented point sets. In this work we extend the technique to explicitly incorporate the points as interpolation constraints. The extension can be interpreted as a generalization of the underlying mathematical framework to a screened Poisson equation. In contrast to other image and geometry processing techniques, the screening term is defined over a sparse set of points rather than over the full domain. We show that these sparse constraints can nonetheless be integrated efficiently. Because the modified linear system retains the same finite-element discretization, the sparsity structure is unchanged, and the system can still be solved using a multigrid approach. Moreover we present several algorithmic improvements that together reduce the time complexity of the solver to linear in the number of points, thereby enabling faster, higher-quality surface reconstructions.

Topics & Concepts

Interpolation (computer graphics)Multigrid methodSolverSurface reconstructionDiscretizationPoisson distributionSurface (topology)GeneralizationComputer scienceLinear systemPoisson's equationApplied mathematicsAlgorithmMathematicsMathematical optimizationLinear interpolationSet (abstract data type)Partial differential equationGeometryImage (mathematics)Mathematical analysisArtificial intelligenceProgramming languagePattern recognition (psychology)StatisticsComputer Graphics and Visualization TechniquesAdvanced Numerical Analysis Techniques3D Shape Modeling and Analysis
Screened poisson surface reconstruction | Litcius