September 5, 2022 to December 9, 2022
IHP
Europe/Paris timezone
Financial support for the participation to the quarter is now closed

Herbert Edelsbrunner - Chromatic Delaunay mosaics for chromatic point data.

Oct 13, 2022, 11:30 AM
1h
Amphitheater Hermite, IHP

Amphitheater Hermite, IHP

Description

The chromatic Delaunay mosaic of s+1 finite sets in d dimensions is an (s+d)-dimensional Delaunay mosaic that represents the individual sets as well as their interactions. For example, it contains a (non-standard) dual of the overlay of the Voronoi tessellations of any subset of the s+1 colors. We prove bounds on the size of the chromatic Delaunay mosaic, in the worst and average case, and suggest how to use image,
kernel, and cokernel persistence to get stable diagrams describing the interaction of the points of different colors.

Acknowledgements. This is incomplete and ongoing joint work with Ranita Biswas, Sebastiano Cultrera, Ondrej Draganov, and Morteza Saghafian, all at IST Austria.

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