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This book is an introduction to the mathematical analysis of probability theory and provides some understanding of how probability is used to model random phenomena of uncertainty, specifically in the context of finance theory and applications. The integrated coverage of both basic probability theory and finance theory makes this book useful reading for advanced undergraduate students or for first-year postgraduate students in a quantitative finance course.
The book provides easy and quick access to the field of theoretical finance by linking the study of applied probability and its applications to finance theory all in one place. The coverage is carefully selected to include most of the key ideas in finance in the last 50 years.
The book will also serve as a handy guide for applied mathematicians and probabilists to easily access the important topics in finance theory and economics. In addition, it will also be a handy book for financial economists to learn some of the more mathematical and rigorous techniques so their understanding of theory is more rigorous. It is a must read for advanced undergraduate and graduate students who wish to work in the quantitative finance area.
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Edition | Availability |
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1
Probability and Finance Theory
2015, World Scientific Publishing Co Pte Ltd
in English
9814641952 9789814641951
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2
Probability and finance theory
2015, World Scientific
Hardcover
in English
- Second Edition.
9814641928 9789814641920
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3 |
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Book Details
First Sentence
"Probability is everywhere and is an important part of our lives."
Table of Contents
Edition Notes
Revised edition of the author's Probability and finance theory, 2011.
Includes index.
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Work Description
This book provides a basic grounding in the use of probability to model random financial phenomena of uncertainty, and is targeted at an advanced undergraduate and graduate level. It should appeal to finance students looking for a firm theoretical guide to the deep end of derivatives and investments. Bankers and finance professionals in the fields of investments, derivatives, and risk management should also find the book useful in bringing probability and finance together.The book contains applications of both discrete time theory and continuous time mathematics, and is extensive in scope. Distribution theory, conditional probability, and conditional expectation are covered comprehensively, and applications to modeling state space securities under market equilibrium are made. Martingale is studied, leading to consideration of equivalent martingale measures, fundamental theorems of asset pricing, change of numeraire and discounting, risk-adjusted and forward-neutral measures, minimal and maximal prices of contingent claims, Markovian models, and the existence of martingale measures preserving the Markov property. Discrete stochastic calculus and multiperiod models leading to no-arbitrage pricing of contingent claims are also to be found in this book, as well as the theory of Markov Chains and appropriate applications in credit modeling. Measure-theoretic probability, moments, characteristic functions, inequalities, and central limit theorems are examined. The theory of risk aversion and utility, and ideas of risk premia are considered. Other application topics include optimal consumption and investment problems and interest rate theory.
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- Created September 21, 2020
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December 19, 2022 | Edited by MARC Bot | import existing book |
November 26, 2022 | Edited by Kaustubh Chakraborty | Updated informations regarding the second edition of the book |
November 26, 2022 | Edited by Kaustubh Chakraborty | //covers.openlibrary.org/b/id/13010070-S.jpg |
October 11, 2020 | Edited by ImportBot | import existing book |
September 21, 2020 | Created by MARC Bot | Imported from Library of Congress MARC record |