Spodarev, Evgeny 1975
Overview
Works:  12 works in 30 publications in 2 languages and 583 library holdings 

Roles:  Author, Editor 
Publication Timeline
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Most widely held works by
Evgeny Spodarev
Stochastic geometry, spatial statistics and random fields : asymptotic methods by
Evgeny Spodarev(
)
15 editions published in 2013 in English and held by 504 WorldCat member libraries worldwide
This volume provides a modern introduction to stochastic geometry, random fields and spatial statistics at a (post)graduate level. It is focused on asymptotic methods in geometric probability including weak and strong limit theorems for random spatial structures (point processes, sets, graphs, fields) with applications to statistics. Written as a contributed volume of lecture notes, it will be useful not only for students but also for lecturers and researchers interested in geometric probability and related subjects
15 editions published in 2013 in English and held by 504 WorldCat member libraries worldwide
This volume provides a modern introduction to stochastic geometry, random fields and spatial statistics at a (post)graduate level. It is focused on asymptotic methods in geometric probability including weak and strong limit theorems for random spatial structures (point processes, sets, graphs, fields) with applications to statistics. Written as a contributed volume of lecture notes, it will be useful not only for students but also for lecturers and researchers interested in geometric probability and related subjects
Infinite divisibility of random fields admitting an integral representation with an infinitely divisible integrator(
)
1 edition published in 2009 in English and held by 15 WorldCat member libraries worldwide
1 edition published in 2009 in English and held by 15 WorldCat member libraries worldwide
Derivation of an upper bound of the constant in the error bound for a near best mterm approximation(
)
1 edition published in 2009 in English and held by 15 WorldCat member libraries worldwide
1 edition published in 2009 in English and held by 15 WorldCat member libraries worldwide
Simulation of infinitely divisible random fields(
)
1 edition published in 2009 in English and held by 15 WorldCat member libraries worldwide
1 edition published in 2009 in English and held by 15 WorldCat member libraries worldwide
Selected topics in the theory of spatial stationary flat processes by
Evgeny Spodarev(
Book
)
3 editions published in 2001 in English and held by 9 WorldCat member libraries worldwide
3 editions published in 2001 in English and held by 9 WorldCat member libraries worldwide
Infinite closed Jackson networks by
Dmitri Chmelev(
Book
)
2 editions published in 2000 in English and held by 5 WorldCat member libraries worldwide
2 editions published in 2000 in English and held by 5 WorldCat member libraries worldwide
On the rose of intersections of stationary flat processes by
Evgeny Spodarev(
Book
)
2 editions published in 2000 in English and held by 5 WorldCat member libraries worldwide
2 editions published in 2000 in English and held by 5 WorldCat member libraries worldwide
Isoperimetric problems and roses of intersections for stationary flat processes by
Evgeny Spodarev(
Book
)
1 edition published in 2000 in German and held by 4 WorldCat member libraries worldwide
1 edition published in 2000 in German and held by 4 WorldCat member libraries worldwide
CauchyKubotatype integral formulae for the generalized cosine transforms by
Evgeny Spodarev(
Book
)
1 edition published in 2001 in English and held by 4 WorldCat member libraries worldwide
1 edition published in 2001 in English and held by 4 WorldCat member libraries worldwide
Ergodicity of a continuous polling model by
Evgeny Spodarev(
Book
)
1 edition published in 2001 in English and held by 4 WorldCat member libraries worldwide
1 edition published in 2001 in English and held by 4 WorldCat member libraries worldwide
Spatial extrapolation of anisotropic road traffic data by Hans Braxmeier(
)
1 edition published in 2004 in English and held by 2 WorldCat member libraries worldwide
A method of spatial extrapolation of traffic data is proposed. The traffic data is given by GPS signals over downtown Berlin sent by approximately 300 taxis. To reconstruct the traffic situation at a given time spatially, i.e., in the form of traffic maps, kriging with moving neighborhood based on residuals is used. Due to significant anisotropy in directed traffic data, theclassical kriging has to be modified in order to include additional information. To verify the extrapolation results, test examples on the basis of a wellknown model of stochastic geometry, the Boolean random function are considered
1 edition published in 2004 in English and held by 2 WorldCat member libraries worldwide
A method of spatial extrapolation of traffic data is proposed. The traffic data is given by GPS signals over downtown Berlin sent by approximately 300 taxis. To reconstruct the traffic situation at a given time spatially, i.e., in the form of traffic maps, kriging with moving neighborhood based on residuals is used. Due to significant anisotropy in directed traffic data, theclassical kriging has to be modified in order to include additional information. To verify the extrapolation results, test examples on the basis of a wellknown model of stochastic geometry, the Boolean random function are considered
Estimation of fractal dimension and fractal curvatures from digital images(
)
1 edition published in 2015 in English and held by 1 WorldCat member library worldwide
Abstract: Most of the known methods for estimating the fractal dimension of fractal sets are based on the evaluation of a single geometric characteristic, e.g. the volume of its parallel sets. We propose a method involving the evaluation of several geometric characteristics, namely all the intrinsic volumes (i.e. volume, surface area, Euler characteristic, etc.) of the parallel sets of a fractal. Motivated by recent results on their limiting behavior, we use these functionals to estimate the fractal dimension of sets from digital images. Simultaneously, we also obtain estimates of the fractal curvatures of these sets, some fractal counterpart of intrinsic volumes, allowing a finer classification of fractal sets than by means of fractal dimension only. We show the consistency of our estimators and test them on some digital images of selfsimilar sets
1 edition published in 2015 in English and held by 1 WorldCat member library worldwide
Abstract: Most of the known methods for estimating the fractal dimension of fractal sets are based on the evaluation of a single geometric characteristic, e.g. the volume of its parallel sets. We propose a method involving the evaluation of several geometric characteristics, namely all the intrinsic volumes (i.e. volume, surface area, Euler characteristic, etc.) of the parallel sets of a fractal. Motivated by recent results on their limiting behavior, we use these functionals to estimate the fractal dimension of sets from digital images. Simultaneously, we also obtain estimates of the fractal curvatures of these sets, some fractal counterpart of intrinsic volumes, allowing a finer classification of fractal sets than by means of fractal dimension only. We show the consistency of our estimators and test them on some digital images of selfsimilar sets
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