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| Author | : Teemu Pennanen |
| Publisher | : |
| Total Pages | : |
| Release | : 2004 |
| Genre | : |
| ISBN | : |
| Author | : Stavros A. Zenios |
| Publisher | : Elsevier |
| Total Pages | : 685 |
| Release | : 2007-08-08 |
| Genre | : Business & Economics |
| ISBN | : 0080548563 |
The Handbooks in Finance are intended to be a definitive source for comprehensive and accessible information in the field of finance. Each individual volume in the series presents an accurate self-contained survey of a sub-field of finance, suitable for use by finance and economics professors and lecturers, professional researchers, graduate students and as a teaching supplement. It is fitting that the series Handbooks in Finance devotes a handbook to Asset and Liability Management. Volume 2 focuses on applications and case studies in asset and liability management.The growth in knowledge about practical asset and liability modeling has followed the popularity of these models in diverse business settings. This volume portrays ALM in practice, in contrast to Volume 1, which addresses the theories and methodologies behind these models. In original articles practitioners and scholars describe and analyze models used in banking, insurance, money management, individual investor financial planning, pension funds, and social security. They put the traditional purpose of ALM, to control interest rate and liquidity risks, into rich and broad-minded frameworks. Readers interested in other business settings will find their discussions of financial institutions both instructive and revealing. * Focuses on pragmatic applications * Relevant to a variety of risk-management industries* Analyzes models used in most financial sectors
| Author | : Jonas Ekblom |
| Publisher | : Linköping University Electronic Press |
| Total Pages | : 36 |
| Release | : 2018-09-13 |
| Genre | : |
| ISBN | : 9176852024 |
This thesis addresses the topic of decision making under uncertainty, with particular focus on financial markets. The aim of this research is to support improved decisions in practice, and related to this, to advance our understanding of financial markets. Stochastic optimization provides the tools to determine optimal decisions in uncertain environments, and the optimality conditions of these models produce insights into how financial markets work. To be more concrete, a great deal of financial theory is based on optimality conditions derived from stochastic optimization models. Therefore, an important part of the development of financial theory is to study stochastic optimization models that step-by-step better capture the essence of reality. This is the motivation behind the focus of this thesis, which is to study methods that in relation to prevailing models that underlie financial theory allow additional real-world complexities to be properly modeled. The overall purpose of this thesis is to develop and evaluate stochastic optimization models that support improved decisions under uncertainty on financial markets. The research into stochastic optimization in financial literature has traditionally focused on problem formulations that allow closed-form or `exact' numerical solutions; typically through the application of dynamic programming or optimal control. The focus in this thesis is on two other optimization methods, namely stochastic programming and approximate dynamic programming, which open up opportunities to study new classes of financial problems. More specifically, these optimization methods allow additional and important aspects of many real-world problems to be captured. This thesis contributes with several insights that are relevant for both financial and stochastic optimization literature. First, we show that the modeling of several real-world aspects traditionally not considered in the literature are important components in a model which supports corporate hedging decisions. Specifically, we document the importance of modeling term premia, a rich asset universe and transaction costs. Secondly, we provide two methodological contributions to the stochastic programming literature by: (i) highlighting the challenges of realizing improved decisions through more stages in stochastic programming models; and (ii) developing an importance sampling method that can be used to produce high solution quality with few scenarios. Finally, we design an approximate dynamic programming model that gives close to optimal solutions to the classic, and thus far unsolved, portfolio choice problem with constant relative risk aversion preferences and transaction costs, given many risky assets and a large number of time periods.
| Author | : Pablo Koch-Medina |
| Publisher | : Springer Nature |
| Total Pages | : 448 |
| Release | : 2020-07-16 |
| Genre | : Mathematics |
| ISBN | : 3030397246 |
Arbitrage Theory provides the foundation for the pricing of financial derivatives and has become indispensable in both financial theory and financial practice. This textbook offers a rigorous and comprehensive introduction to the mathematics of arbitrage pricing in a discrete-time, finite-state economy in which a finite number of securities are traded. In a first step, various versions of the Fundamental Theorem of Asset Pricing, i.e., characterizations of when a market does not admit arbitrage opportunities, are proved. The book then focuses on incomplete markets where the main concern is to obtain a precise description of the set of “market-consistent” prices for nontraded financial contracts, i.e. the set of prices at which such contracts could be transacted between rational agents. Both European-type and American-type contracts are considered. A distinguishing feature of this book is its emphasis on market-consistent prices and a systematic description of pricing rules, also at intermediate dates. The benefits of this approach are most evident in the treatment of American options, which is novel in terms of both the presentation and the scope, while also presenting new results. The focus on discrete-time, finite-state models makes it possible to cover all relevant topics while requiring only a moderate mathematical background on the part of the reader. The book will appeal to mathematical finance and financial economics students seeking an elementary but rigorous introduction to the subject; mathematics and physics students looking for an opportunity to get acquainted with a modern applied topic; and mathematicians, physicists and quantitatively inclined economists working or planning to work in the financial industry.
| Author | : Serena Mercado |
| Publisher | : |
| Total Pages | : 226 |
| Release | : 2008 |
| Genre | : Options (Finance) |
| ISBN | : |
This thesis focuses on pricing derivatives securities such as stock options in incomplete financial markets. The goal is to determine arbitrage free prices for these securities. For this we consider a finite state, discrete time stochastic model of a financial market known as the finite market model. We restrict our attention to derivatives securities known as European contingent claims, those that can only be exercised on the expiration date. In the early chapters, we define the model precisely and also summarize the pricing theory for complete markets. In this case, it turns out that there is a unique way to price arbitrage freely. This unique price can be computed as a certain conditional expected value under the associated equivalent martingale measure. The larger goal of this thesis is to give a thorough exposition of the pricing theory for incomplete markets. We will show that in these markets, arbitrage free prices exist, but unique pricing cannot always be obtained. When a particular price is not unique, there is an open interval over which the price can vary freely. The left ( resp. right) end points of this interval can be characterized as an infimum (resp. a supremum) of a certain conditional expected value over the set of associated equivalent martingale measures. Keywords: Financial Markets, Incomplete Markets, European Contingent Claims, Discrete Stochastic Models, and Arbitrage Free Pricing
| Author | : Sigrid Müller |
| Publisher | : Springer Science & Business Media |
| Total Pages | : 160 |
| Release | : 2013-03-13 |
| Genre | : Law |
| ISBN | : 3642465609 |
| Author | : Ioannis Karatzas |
| Publisher | : |
| Total Pages | : |
| Release | : 1998 |
| Genre | : |
| ISBN | : |
The valuation theory for American Contingent Claims, due to Bensoussan (1984) and Karatzas (1988), is extended to deal with constraints on portfolio choice, including incomplete markets and borrowing/short-selling constraints, or with different interest rates for borrowing and lending. In the unconstrained case, the classical theory provides a single arbitrage-free price $u_0$; this is expressed as the supremum, over all stopping times, of the claim's expected discounted value under the equivalent martingale measure. In the presence of constraints, $ {u_0 }$ is replaced by an entire interval $[h_{ rm low}, h_{ rm up}]$ of arbitrage-free prices, with endpoints characterized as $h_{ rm low} = inf_{ nu in{ cal D}}u_ nu, h_{ rm up} = sup_{ nu in{ cal D}} u_ nu$. Here $u_ nu$ is the analogue of $u_0$, the arbitrage-free price with unconstrained portfolios, in an auxiliary market model ${ cal M}_ nu$; and the family $ {{ calM}_ nu }_{ nu in{ cal D}}$ is suitably chosen, to contain the original model and to reflect the constraints on portfolios. For several such constraints, explicit computations of the endpoints are carried out in the case of the American call-option. The analysis involves novel results in martingale theory (including simultaneous Doob Meyer decompositions), optimal stopping and stochastic control problems, stochastic games, and uses tools from convex analysis.
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| Release | : 1985 |
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| Author | : Noel Valliant dit Massart |
| Publisher | : |
| Total Pages | : |
| Release | : 1995 |
| Genre | : |
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| Author | : Tomas Björk |
| Publisher | : Oxford University Press |
| Total Pages | : 546 |
| Release | : 2009-08-06 |
| Genre | : Business & Economics |
| ISBN | : 019957474X |
The third edition of this popular introduction to the classical underpinnings of the mathematics behind finance continues to combine sound mathematical principles with economic applications.Concentrating on the probabilistic theory of continuous arbitrage pricing of financial derivatives, including stochastic optimal control theory and Merton's fund separation theory, the book is designed for graduate students and combines necessary mathematical background with a solid economic focus. It includes a solved example for every new technique presented, contains numerous exercises, and suggests further reading in each chapter.In this substantially extended new edition Bjork has added separate and complete chapters on the martingale approach to optimal investment problems, optimal stopping theory with applications to American options, and positive interest models and their connection to potential theory and stochastic discount factors.More advanced areas of study are clearly marked to help students and teachers use the book as it suits their needs.
