This book covers the theory of derivatives pricing and hedging as well as techniques used in mathematical finance. The authors use a top-down approach, starting with fundamentals before moving to applications, and present theoretical developments alongside various exercises, providing many examples of practical interest.
A large spectrum of concepts and mathematical tools that are usually found in separate monographs are presented here. In addition to the no-arbitrage theory in full generality, this book also explores models and practical hedging and pricing issues. Fundamentals and Advanced Techniques in Derivatives Hedging further introduces advanced methods in probability and analysis, including Malliavin calculus and the theory of viscosity solutions, as well as the recent theory of stochastic targets and its use in risk management, making it the first textbook covering this topic.
Graduate students in applied mathematics with an understanding of probability theory and stochastic calculus will find this book useful to gain a deeper understanding of fundamental concepts and methods in mathematical finance.
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"The book is intended for Master's and young Ph.D. students, the authors try to present the main aspects of arbitrage theory in a self-contained way based on Kabanov and Stricker's results. ... The book presents a variety of problems, aspects and techniques of modern mathematics of finance. An additional value of the book is the nontrivial problems which are added to each chapter. At the end of each chapter there are suggestions or hints on how to solve these problems." (L. Stettner, Mathematical Reviews, August, 2017)