"The present book is recommendable especially to graduate students who are familiar with quantum theory and equilibrium statistical physics including the mathematics of spectral analysis (eigenvalues, eigenvectors, Fourier and Laplace transformations)." (Isamu Dôku, zbMATH 1409.81005, 2019)

Introduction - Dynamics of Relevant Variables- Generated Dynamics.- Formal Solutions.- Special Solutions.- Observables, States, Entropy and Generating Functionals.- Symmetries and Breaking of Symmetries.- Topology.- Selected Applications.

Martin Janßen is a private lecturer at the Institute of Theoretical Physics at the University of Cologne and a high school teacher at the Friedrich-Wilhelm-Gymnasium in Cologne. He gained his doctorate in 1990 in Cologne for his work on magneto transport and multifractality in the context of the quantum Hall effect and his venia legendi in 1997, on completion of his post-doctoral thesis on statistics and scaling in mesoscopic electron systems. He held a DFG Postdoctoral Fellowship at Oxford University in 1993 and a Minerva Postdoctoral Fellowship at Haifa University in 1995. He has been a member of academic staff at the University of Cologne from 1992 to 1998 and at Bochum University from 1998 to 2001. After working as an environmental physicist from 2001 to 2011 he became a high school teacher in physics and mathematics. Since 2001 he gives lectures at the University of Cologne on Theoretical Physics with emphasis on dynamics of stochastic processes. He has co-written a book on the integer quantum Hall effect and written a book on fluctuations and localization in mesoscopic electron systems. 

This book presents Markov and quantum processes as two sides of a coin called generated stochastic processes. It deals with quantum processes as  reversible stochastic processes generated by one-step unitary operators, while Markov processes are irreversible stochastic processes generated by one-step stochastic operators. The characteristic feature of quantum processes are oscillations, interference, lots of stationary states in bounded systems and possible asymptotic stationary scattering states in open systems, while the characteristic feature of Markov processes are relaxations to a single stationary state. Quantum processes apply to systems where all variables, that control reversibility, are taken as relevant variables, while Markov processes emerge when some of those variables cannot be followed and are thus irrelevant for the dynamic description. Their absence renders the dynamic irreversible.