A First Course in Probability and Markov Chains presents an introduction to the basic elements in probability and focuses on two main areas. The first part explores notions and structures in probability, including combinatorics, probability measures, probability distributions, conditional probability, inclusion-exclusion formulas, random variables, dispersion indexes, independent random variables as well as weak and strong laws of large numbers and central limit theorem. In the second part of the book, focus is given to Discrete Time Discrete Markov Chains which is addressed together with an introduction to Poisson processes and Continuous Time Discrete Markov Chains. This book also looks at making use of measure theory notations that unify all the presentation, in particular avoiding the separate treatment of continuous and discrete distributions.
[1]
Thomas W. Valente,et al.
Communication Network Analysis
,
2008
.
[2]
Persi Diaconis,et al.
The Markov chain Monte Carlo revolution
,
2008
.
[3]
S. R. Srinivasa Varadhan,et al.
Stochastic Processes
,
2018,
Gauge Integral Structures for Stochastic Calculus and Quantum Electrodynamics.
[4]
William Feller,et al.
An Introduction to Probability Theory and Its Applications
,
1967
.
[5]
Ehrhard Behrends.
Introduction to Markov Chains With Special Emphasis on Rapid Mixing
,
2013
.
[6]
S. Varadhan,et al.
Probability Theory
,
2001
.
[7]
V. Kulkarni.
Modeling and Analysis of Stochastic Systems
,
1996
.
[8]
Marco Ajmone Marsan,et al.
Modelling with Generalized Stochastic Petri Nets
,
1995,
PERV.