On the approximation of intrinsic volumes

Pausinger F. 2015. On the approximation of intrinsic volumes. Institute of Science and Technology Austria.

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Thesis | PhD | Published | English
Department
Series Title
ISTA Thesis
Abstract
This thesis is concerned with the computation and approximation of intrinsic volumes. Given a smooth body M and a certain digital approximation of it, we develop algorithms to approximate various intrinsic volumes of M using only measurements taken from its digital approximations. The crucial idea behind our novel algorithms is to link the recent theory of persistent homology to the theory of intrinsic volumes via the Crofton formula from integral geometry and, in particular, via Euler characteristic computations. Our main contributions are a multigrid convergent digital algorithm to compute the first intrinsic volume of a solid body in R^n as well as an appropriate integration pipeline to approximate integral-geometric integrals defined over the Grassmannian manifold.
Publishing Year
Date Published
2015-06-01
Publisher
Institute of Science and Technology Austria
Page
144
ISSN
IST-REx-ID

Cite this

Pausinger F. On the approximation of intrinsic volumes. 2015.
Pausinger, F. (2015). On the approximation of intrinsic volumes. Institute of Science and Technology Austria.
Pausinger, Florian. “On the Approximation of Intrinsic Volumes.” Institute of Science and Technology Austria, 2015.
F. Pausinger, “On the approximation of intrinsic volumes,” Institute of Science and Technology Austria, 2015.
Pausinger F. 2015. On the approximation of intrinsic volumes. Institute of Science and Technology Austria.
Pausinger, Florian. On the Approximation of Intrinsic Volumes. Institute of Science and Technology Austria, 2015.

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