Add to ORKGThe purpose of this paper is to summarize results on various aspects of sets with positive reach, which are up to now not available in such a compact form. After recalling briefly the results before 1959, sets with positive reach and their associated curvature measures are introduced. We develop an integral and current representation of these curvature measures and show how the current representation helps to prove integralgeometric formulas, such as the principal kinematic formula. Also random sets with positive reach and random mosaics (or the more general random cell-complexes) with general cell shape are considered
The authors define a class of random measures, spatially independent martingales, which we view as a...
This survey contains a selection of topics unified by the concept of positive semidefiniteness (of m...
In 1973, Helfrich suggested a simple model to describe the shapes of vesicles: a free bend...
The goal of this thesis is to collect various properties of sets with positive reach and to describe...
The book describes how curvature measures can be introduced for certain classes of sets with singula...
summary:By taking into account the work of {\it J. Rataj} and {\it M. Z\"ahle} [Geom. Dedicata 57, 2...
summary:By taking into account the work of {\it J. Rataj} and {\it M. Z\"ahle} [Geom. Dedicata 57, 2...
summary:By taking into account the work of {\it J. Rataj} and {\it M. Z\"ahle} [Geom. Dedicata 57, 2...
The goal of this thesis is to collect various properties of sets with positive reach and to describe...
Abstract. The existence of mixed curvature measures of two sets in Rd with posi-tive reach introduce...
Quantitative versions (i.e., taking into account a suitable ``distance'' of a set from being a spher...
Quantitative versions (i.e., taking into account a suitable ``distance'' of a set from being a spher...
We investigate the connection between stochastic and integral geometry. Namely, we illustrate the ro...
Extending the celebrated results of Alexandrov (1958) and Korevaar-Ros (1988) for smooth sets, as we...
We address the problem of curvature estimation from sampled compact sets. The main contribution is a...
The authors define a class of random measures, spatially independent martingales, which we view as a...
This survey contains a selection of topics unified by the concept of positive semidefiniteness (of m...
In 1973, Helfrich suggested a simple model to describe the shapes of vesicles: a free bend...
The goal of this thesis is to collect various properties of sets with positive reach and to describe...
The book describes how curvature measures can be introduced for certain classes of sets with singula...
summary:By taking into account the work of {\it J. Rataj} and {\it M. Z\"ahle} [Geom. Dedicata 57, 2...
summary:By taking into account the work of {\it J. Rataj} and {\it M. Z\"ahle} [Geom. Dedicata 57, 2...
summary:By taking into account the work of {\it J. Rataj} and {\it M. Z\"ahle} [Geom. Dedicata 57, 2...
The goal of this thesis is to collect various properties of sets with positive reach and to describe...
Abstract. The existence of mixed curvature measures of two sets in Rd with posi-tive reach introduce...
Quantitative versions (i.e., taking into account a suitable ``distance'' of a set from being a spher...
Quantitative versions (i.e., taking into account a suitable ``distance'' of a set from being a spher...
We investigate the connection between stochastic and integral geometry. Namely, we illustrate the ro...
Extending the celebrated results of Alexandrov (1958) and Korevaar-Ros (1988) for smooth sets, as we...
We address the problem of curvature estimation from sampled compact sets. The main contribution is a...
The authors define a class of random measures, spatially independent martingales, which we view as a...
This survey contains a selection of topics unified by the concept of positive semidefiniteness (of m...
In 1973, Helfrich suggested a simple model to describe the shapes of vesicles: a free bend...