Lévy-based growth models
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Publication:1002576
DOI10.3150/07-BEJ6130zbMath1158.60349arXiv0803.0860OpenAlexW1904955818MaRDI QIDQ1002576
Eva B. Vedel Jensen, Jürgen Schmiegel, Kristjana Ýr Jónsdóttir
Publication date: 2 March 2009
Published in: Bernoulli (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/0803.0860
Directional data; spatial statistics (62H11) Processes with independent increments; Lévy processes (60G51) Geometric probability and stochastic geometry (60D05) Developmental biology, pattern formation (92C15) Random measures (60G57)
Related Items (19)
Stereological Estimation of Mean Particle Volume Tensors in $$\mathbb{R}^{3}$$ from Vertical Sections ⋮ Extreme value theory for spatial random fields -- with application to a Lévy-driven field ⋮ Simulation of Infinitely Divisible Random Fields ⋮ On a linear functional for infinitely divisible moving average random fields ⋮ Spatio-temporal model for a random set given by a union of interacting discs ⋮ Estimating Particle Shape and Orientation Using Volume Tensors ⋮ Simulation methods and error analysis for trawl processes and ambit fields ⋮ Lévy-based Cox point processes ⋮ On the use of particle Markov chain Monte Carlo in parameter estimation of space-time interacting discs ⋮ Stereological Modelling of Random Particles ⋮ Excursion sets of infinitely divisible random fields with convolution equivalent Lévy measure ⋮ Approximating ambit fields via Fourier methods ⋮ Tail asymptotics for the supremum of an infinitely divisible field with convolution equivalent Lévy measure ⋮ Tail asymptotics of an infinitely divisible space-time model with convolution equivalent Lévy measure ⋮ Completely random signed measures ⋮ Central limit theorem for mean and variogram estimators in Lévy–based models ⋮ Lévy-based Modelling in Brain Imaging ⋮ Ambit fields: a stochastic modelling approach ⋮ Gaussian Random Particles with Flexible Hausdorff Dimension
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