Given the explosion of interest in mathematical methods for
solving problems in finance and trading, a great deal of research
and development is taking place in universities, large brokerage
firms, and in the supporting trading software industry.
Mathematical advances have been made both analytically and
numerically in finding practical solutions.
This book provides a comprehensive overview of existing and
original material, about what mathematics when allied with
Mathematica can do for finance. Sophisticated theories are
presented systematically in a user-friendly style, and a powerful
combination of mathematical rigor and Mathematica programming.
Three kinds of solution methods are emphasized: symbolic,
numerical, and Monte-- Carlo. Nowadays, only good personal
computers are required to handle the symbolic and numerical methods
that are developed in this book.
Key features: * No previous knowledge of Mathematica programming
is required * The symbolic, numeric, data management and graphic
capabilities of Mathematica are fully utilized * Monte--Carlo
solutions of scalar and multivariable SDEs are developed and
utilized heavily in discussing trading issues such as
Black--Scholes hedging * Black--Scholes and Dupire PDEs are solved
symbolically and numerically * Fast numerical solutions to free
boundary problems with details of their Mathematica realizations
are provided * Comprehensive study of optimal portfolio
diversification, including an original theory of optimal portfolio
hedging under non-Log-Normal asset price dynamics is presented
The book is designed for the academic community of instructors
and students, and most importantly, will meet the everyday trading
needs of quantitatively inclined professional and individual
investors.
General
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