Crossref Citations
This article has been cited by the following publications. This list is generated based on data provided by
Crossref.
Dereudre, David
2009.
The existence of quermass-interaction processes for nonlocally stable interaction and nonbounded convex grains.
Advances in Applied Probability,
Vol. 41,
Issue. 3,
p.
664.
Moller, Jesper
and
Helisova, Katerina
2009.
Simulation of Random Set Models for Unions of Discs and the Use of Power Tessellations.
p.
99.
MØLLER, JESPER
and
HELISOVÁ, KATEŘINA
2010.
Likelihood Inference for Unions of Interacting Discs.
Scandinavian Journal of Statistics,
Vol. 37,
Issue. 3,
p.
365.
COEURJOLLY, JEAN‐FRANOIS
DEREUDRE, DAVID
DROUILHET, RÉMY
and
LAVANCIER, FRÉDÉRIC
2012.
Takacs–Fiksel Method for Stationary Marked Gibbs Point Processes.
Scandinavian Journal of Statistics,
Vol. 39,
Issue. 3,
p.
416.
Zikmundová, Markéta
Staňková Helisová, Kateřina
and
Beneš, Viktor
2012.
Spatio-Temporal Model for a Random Set Given by a Union of Interacting Discs.
Methodology and Computing in Applied Probability,
Vol. 14,
Issue. 3,
p.
883.
Zikmundová, Markéta
Staňková Helisová, Kateřina
and
Beneš, Viktor
2014.
On the Use of Particle Markov Chain Monte Carlo in Parameter Estimation of Space-Time Interacting Discs.
Methodology and Computing in Applied Probability,
Vol. 16,
Issue. 2,
p.
451.
Staňková Helisová, Kateřina
and
Staněk, Jakub
2014.
Dimension Reduction in Extended Quermass-Interaction Process.
Methodology and Computing in Applied Probability,
Vol. 16,
Issue. 2,
p.
355.
Dereudre, David
Lavancier, Frédéric
and
Helisová, Kateřina Staňková
2014.
Estimation of the Intensity Parameter of the Germ‐Grain Quermass‐Interaction Model when the Number of Germs is not Observed.
Scandinavian Journal of Statistics,
Vol. 41,
Issue. 3,
p.
809.
Helisová, Kateřina
2014.
TMS 2014 Supplemental Proceedings.
p.
461.
Lavancier, F.
and
Kervrann, C.
2015.
Geometric Science of Information.
Vol. 9389,
Issue. ,
p.
179.
Hermann, Philipp
Mrkvička, Tomáš
Mattfeldt, Torsten
Minárová, Mária
Helisová, Kateřina
Nicolis, Orietta
Wartner, Fabian
and
Stehlík, Milan
2015.
Fractal and stochastic geometry inference for breast cancer: a case study with random fractal models and Quermass-interaction process.
Statistics in Medicine,
Vol. 34,
Issue. 18,
p.
2636.
Večeřa, Jakub
and
Beneš, Viktor
2017.
Approaches to asymptotics for U-statistics of Gibbs facet processes.
Statistics & Probability Letters,
Vol. 122,
Issue. ,
p.
51.
Houdebert, Pierre
2018.
Percolation results for the continuum random cluster model.
Advances in Applied Probability,
Vol. 50,
Issue. 01,
p.
231.
Dereudre, David
and
Vasseur, Thibaut
2020.
Existence of Gibbs point processes with stable infinite range interaction.
Journal of Applied Probability,
Vol. 57,
Issue. 3,
p.
775.
Moka, Sarat
Juneja, Sandeep
and
Mandjes, Michel
2021.
Rejection- and importance-sampling-based perfect simulation for Gibbs hard-sphere models.
Advances in Applied Probability,
Vol. 53,
Issue. 3,
p.
839.
Dogaš, Vesna Gotovac
and
Helisová, Kateřina
2021.
Testing Equality of Distributions of Random Convex Compact Sets via Theory of $\mathfrak {N}$-Distances.
Methodology and Computing in Applied Probability,
Vol. 23,
Issue. 2,
p.
503.
Debayle, Johan
Ðogaš, Vesna Gotovac
Helisová, Kateřina
Staněk, Jakub
and
Zikmundová, Markéta
2021.
Assessing Similarity of Random sets via Skeletons.
Methodology and Computing in Applied Probability,
Vol. 23,
Issue. 2,
p.
471.
Gotovac Ðogaš, Vesna
2024.
Depth for samples of sets with applications to testing equality in distribution of two samples of random sets.
Journal of Statistical Computation and Simulation,
p.
1.
Allevi, Elisabetta
Martínez-Legaz, Juan Enrique
and
Riccardi, Rossana
2024.
On the Basic Properties and the Structure of Power Cells.
Journal of Optimization Theory and Applications,