"The normal distribution, the Brownian motion process and the bigger class of Gaussian processes are well known in both theory and applications. Chapter 1 of this book contains the main notions and results on Gaussian processes. Then, in Chapter 2, the authors turn to the analysis of fractional and sub-fractional Brownian motions. It is shown their existence and analytical properties which are used in constructing stochastic integrals. The main subject in the book is Chapter 3 dealing with mixed fractional and mixed sub-fractional Brownian motions. The authors establish path properties, series expansions and semi-martingale properties. Proofs are provided for some of the results, otherwise, appropriate references are given. There are illustrative examples in the text. At the end of each chapter there are useful exercises. The book ends with an appendix, bibliography and an index. The book will be useful to PhD students and researchers in modern probability theory, especially to those interested in modelling phenomena which are dynamic and of a fractional nature.

Two final comments. The first is to the authors. There are typos, fortunately not too many, they are easy to detect and correct. There are a few fundamental sources missing in the bibliography. The second comment is addressed to the publisher. The practice to use italics font for the full text of all examples and all exercises is unusual and quite strange. To follow such a style puts you far from the well-established traditions of the best international publishers." --zbMATH Open

"The book under review deals with two classes of specific Gaussian processes, namely, (mixed) fractional Brownian motion and (mixed) sub fractional Brownian motion." --Mathematical Reviews Clippings

1. Gaussian Processes 2. Fractional and Sub-fractional Brownian Motions 3. Mixed Fractional and Mixed Sub-fractional Brownian Motions

Yuliya Mishura is Professor and Head of the Department of Probability Theory, Statistics and Actuarial Mathematics, Faculty of Mechanics and Mathematics, Taras Shevchenko National University of Kyiv, Ukraine. Her research interests include stochastic analysis, theory of stochastic processes, stochastic differential equations, numerical schemes, financial mathematics, risk processes, statistics of stochastic processes, and models with long-range dependence. Mounir Zili works at the University of Monastir, Faculty of sciences of Monastir with expertise in Probability Theory, Applied Mathematics, Analysis