Probability Models [electronic resource] / by John Haigh.
Contributor(s): SpringerLink (Online service)Material type: TextSeries: Springer Undergraduate Mathematics Series: Publisher: London : Springer London : Imprint: Springer, 2013Edition: 2nd ed. 2013Description: XII, 287 p. 17 illus. online resourceContent type: text Media type: computer Carrier type: online resourceISBN: 9781447153436Subject(s): Mathematics | Operations research | Decision making | Mathematical statistics | Computer simulation | Computer science -- Mathematics | Computer mathematics | Mathematical physics | Probabilities | Mathematics | Probability Theory and Stochastic Processes | Simulation and Modeling | Probability and Statistics in Computer Science | Operation Research/Decision Theory | Mathematical Applications in Computer Science | Mathematical Applications in the Physical SciencesAdditional physical formats: Printed edition:: No titleDDC classification: 519.2 LOC classification: QA273.A1-274.9QA274-274.9Online resources: Click here to access online
|Item type||Current location||Collection||Call number||Status||Date due||Barcode||Item holds|
Probability Spaces -- Conditional Probability and Independence -- Common Probability Distributions -- Random Variables -- Sums of Random Variables -- Convergence and Limit Theorems -- Stochastic Processes in Discrete Time -- Stochastic Processes in Continuous Time -- Appendix: Common Distributions and Mathematical Facts.
The purpose of this book is to provide a sound introduction to the study of real-world phenomena that possess random variation. It describes how to set up and analyse models of real-life phenomena that involve elements of chance. Motivation comes from everyday experiences of probability, such as that of a dice or cards, the idea of fairness in games of chance, and the random ways in which, say, birthdays are shared or particular events arise. Applications include branching processes, random walks, Markov chains, queues, renewal theory, and Brownian motion. This popular second edition textbook contains many worked examples and several chapters have been updated and expanded. Some mathematical knowledge is assumed. The reader should have the ability to work with unions, intersections and complements of sets; a good facility with calculus, including integration, sequences and series; and appreciation of the logical development of an argument. Probability Models is designed to aid students studying probability as part of an undergraduate course on mathematics or mathematics and statistics.