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On random sets admitting curvatures

Jan Rataj (Charles University, Praha)
Torsdag, 31 august, 2017, at 13:15-14:00, in Koll. D (1531-211)

In stochastic geometry, the model of particle process with convex particles is usually applied when working with characteristics derived from curvature measures. A more general framework is that of particles with positive reach (Federer, 1959); the stochastic model was introduced by Zähle (1986). Recently, a substantially larger family of WDC sets still admitting curvature measures was introduced (Pokorný & R., 2013).

In order to approach stochastic applications, it has to be shown that the family of WDC sets with suitable metric is a standard Borel space.

For the subclass of compact DC domains (sets whose boundary is locally representable as difference of convex functions), this has been shown by Zubal (2015).


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