Yuriy Kozachenko is Professor at Taras Shevchenko National University of Kyiv, Ukraine.Doctor of Sciences in Physics and Mathematics, Laureate of the State Prize of Ukraine in Science and TechnologyMain scientific research interests relate to the study of the properties of random processes in various functional spaces, simulation and statistics of random processes, the theory of wavelet expansions of random processes. One of the founders of the theory of sub-Gaussian and f-subGaussian random processes, random processes from Orlicz spaces. Determination of accuracy and reliability of computer simulation of random processes.Author of over 300 scientific papers, several textbooks and seven monographs. Associate professor at Department of Department of Probability Theory and Mathematical Analysis, UzhNU from 2008;Her scientific interests are in the field of simulation of point stochastic processes and fields with given accuracy and reliability, e.g. Cox Processes driven by random intensity, analytical properties of point processes and fields. Author of more than 10 papers. Associate professor at Department of Applied Statistics, TSNUK, Ukraine from 2011.Her scientific interests are in the field of simulation of stochastic processes and fields with given accuracy and reliability in different Banach spaces, analytical properties of stochastic processes and fields; survey statistics. Author of more than 40 papers. Associate professor at Department of Applied Statistics, from 2011.Her scientific interests are in the field of simulation of stochastic processes and fields with given accuracy and reliability in different Banach spaces, analytical properties of stochastic processes and fields; survey statistics. Author of more than 20 papers
"""The book will be useful both for mathematicians and practitioners who deal with stochastic models. It contains rigorous formulas together with simulation results. The mathematical level of the book is high, however it is accessible for everybody who is interested in approximations of stochastic processes."" --Zentralblatt MATH 1376"