Описание: Structured Products Volume 1 consists of 4 Parts and 20 Chapters covering applications of derivatives, the creation of synthetic assets using derivaves (such as asset swaps, structured notes and repackaged assets), exotic options, non-generic derivative structures used in interest rates and currency markets (including non-generic swaps, basis (floating-to-floating) swaps, swaptions (options on interest rate swaps), callable bonds, CMT products, IAR products, interest rate and currency structured products.
Описание: Structured Products Volume 2 consists of 5 Parts and 21 Chapters covering equity derivatives (including equity swaps/options, convertible securities and equity linked notes) , commodity derivatives (including energy, metal and agricultural derivatives), credit derivatives (including credit linked notes/collateralised debt obligations ("CDOs")), new derivative markets (including inflation linked derivatives and notes, insurance derivatives, weather derivatives, property, bandwidth/telephone minutes, macro-economic index and emission/environmental derivatives ) and tax based applications of derivatives. It also covers the structure and evolution of derivative markets including electronic trading markets and the origins, evolution and prospects for derivative markets. EQUITY LINKED STRUCTURES 55. Equity Derivatives - Equity Futures; Equity Options/Warrants & Equity Swaps 56. Convertible Securities 57. Structured Convertible Securities 58. Equity Linked Notes 59. Equity Derivatives - Investor Applications 60. Equity Capital Management - Corporate Finance Applications of Equity Derivatives COMMODITY LINKED STRUCTURES 61. Commodity Derivatives - Commodity Futures/Options, Commodity Swaps and Comdity Linked Notes 62. Commodity Derivatives - Energy (Oil, Natural Gas and Electricity) Markets 63. Commodity Derivatives - Metal Markets 64. Commodity Derivatives - Agricultural and Other Markets CREDIT DERVIATIVES 65. Credit Derivative Products 66. Credit Linked Notes/Collateralised Debt Obligations 67. Credit Derivatives/Default Risk - Pricing and Modelling 68. Credit Derivatives - Applications/Markets NEW MARKETS 69. Inflation Indexed Notes and Derivatives. 70. Alternative Risk Transfer/Insurance Derivatives 71. Weather Derivatives 72. New Markets - Property; Bandwidth; Macro-Economic & Environmental Derivatives 73. Tax and Structured Derivatives Transactions EVOLUTION OF DERIVATIVES MARKETS 74. Electronic Markets and Derivatives Trading 75. Financial Derivatives - Evolution and Prospects
Автор: Ali Hirsa Название: An Introduction to the Mathematics of Financial Derivatives, ISBN: 012384682X ISBN-13(EAN): 9780123846822 Издательство: Elsevier Science Рейтинг: Цена: 13304.00 р. Наличие на складе: Есть у поставщика Поставка под заказ.
Описание: A text that eases the transition between basic summaries of financial engineering to more advanced treatments using stochastic calculus. Requiring a basic knowledge of calculus and probability, it takes readers on a tour of advanced financial engineering. It encourages use of discrete chapters as complementary readings on different topics.
This textbook is a short comprehensive and intuitive introduction to Lie group analysis of ordinary and partial differential equations. This practical-oriented material contains a large number of examples and problems accompanied by detailed solutions and figures. In comparison with the known beginner guides to Lie group analysis, the book is oriented toward students who are interested in financial mathematics, mathematical finance and economics.
We provide the results of the Lie group analysis of actual models in Financial Mathematics using recent publications. These models are usually formulated as nonlinear partial differential equations and are rather difficult to make use of. With the help of Lie group analysis it is possible to describe some important properties of these models and to obtain interesting reductions in a clear and understandable algorithmic way.
The book can serve as a short introduction for a further study of modern geometrical analysis applied to models in financial mathematics. It can also be used as textbook in a master's program, in an intensive compact course, or for self study.
The textbook with a large number of examples will be useful not only for students who are interested in Financial Mathematics but also for people who are working in other areas of research that are not directly connected with Physics (for instance in such areas of Applied Mathematics like mathematical economy, bio systems, coding theory, etc.).
